# -*- coding: utf-8 -*-
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# Natural Language Toolkit: Probability and Statistics
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#
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# Copyright (C) 2001-2019 NLTK Project
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# Author: Edward Loper <edloper@gmail.com>
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# Steven Bird <stevenbird1@gmail.com> (additions)
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# Trevor Cohn <tacohn@cs.mu.oz.au> (additions)
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# Peter Ljunglöf <peter.ljunglof@heatherleaf.se> (additions)
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# Liang Dong <ldong@clemson.edu> (additions)
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# Geoffrey Sampson <sampson@cantab.net> (additions)
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# Ilia Kurenkov <ilia.kurenkov@gmail.com> (additions)
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#
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# URL: <http://nltk.org/>
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# For license information, see LICENSE.TXT
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"""
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Classes for representing and processing probabilistic information.
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The ``FreqDist`` class is used to encode "frequency distributions",
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which count the number of times that each outcome of an experiment
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occurs.
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The ``ProbDistI`` class defines a standard interface for "probability
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distributions", which encode the probability of each outcome for an
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experiment. There are two types of probability distribution:
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- "derived probability distributions" are created from frequency
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distributions. They attempt to model the probability distribution
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that generated the frequency distribution.
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- "analytic probability distributions" are created directly from
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parameters (such as variance).
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The ``ConditionalFreqDist`` class and ``ConditionalProbDistI`` interface
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are used to encode conditional distributions. Conditional probability
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distributions can be derived or analytic; but currently the only
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implementation of the ``ConditionalProbDistI`` interface is
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``ConditionalProbDist``, a derived distribution.
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"""
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from __future__ import print_function, unicode_literals, division
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import math
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import random
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import warnings
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import array
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from collections import defaultdict, Counter
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from functools import reduce
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from abc import ABCMeta, abstractmethod
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from six import itervalues, text_type, add_metaclass
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from nltk import compat
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from nltk.internals import raise_unorderable_types
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_NINF = float('-1e300')
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##//////////////////////////////////////////////////////
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## Frequency Distributions
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##//////////////////////////////////////////////////////
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@compat.python_2_unicode_compatible
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class FreqDist(Counter):
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"""
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A frequency distribution for the outcomes of an experiment. A
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frequency distribution records the number of times each outcome of
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an experiment has occurred. For example, a frequency distribution
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could be used to record the frequency of each word type in a
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document. Formally, a frequency distribution can be defined as a
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function mapping from each sample to the number of times that
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sample occurred as an outcome.
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Frequency distributions are generally constructed by running a
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number of experiments, and incrementing the count for a sample
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every time it is an outcome of an experiment. For example, the
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following code will produce a frequency distribution that encodes
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how often each word occurs in a text:
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>>> from nltk.tokenize import word_tokenize
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>>> from nltk.probability import FreqDist
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>>> sent = 'This is an example sentence'
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>>> fdist = FreqDist()
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>>> for word in word_tokenize(sent):
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... fdist[word.lower()] += 1
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An equivalent way to do this is with the initializer:
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>>> fdist = FreqDist(word.lower() for word in word_tokenize(sent))
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"""
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def __init__(self, samples=None):
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"""
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Construct a new frequency distribution. If ``samples`` is
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given, then the frequency distribution will be initialized
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with the count of each object in ``samples``; otherwise, it
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will be initialized to be empty.
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In particular, ``FreqDist()`` returns an empty frequency
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distribution; and ``FreqDist(samples)`` first creates an empty
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frequency distribution, and then calls ``update`` with the
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list ``samples``.
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:param samples: The samples to initialize the frequency
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distribution with.
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:type samples: Sequence
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"""
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Counter.__init__(self, samples)
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# Cached number of samples in this FreqDist
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self._N = None
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def N(self):
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"""
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Return the total number of sample outcomes that have been
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recorded by this FreqDist. For the number of unique
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sample values (or bins) with counts greater than zero, use
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``FreqDist.B()``.
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:rtype: int
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"""
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if self._N is None:
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# Not already cached, or cache has been invalidated
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self._N = sum(self.values())
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return self._N
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def __setitem__(self, key, val):
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"""
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Override ``Counter.__setitem__()`` to invalidate the cached N
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"""
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self._N = None
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super(FreqDist, self).__setitem__(key, val)
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def __delitem__(self, key):
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"""
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Override ``Counter.__delitem__()`` to invalidate the cached N
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"""
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self._N = None
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super(FreqDist, self).__delitem__(key)
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def update(self, *args, **kwargs):
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"""
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Override ``Counter.update()`` to invalidate the cached N
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"""
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self._N = None
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super(FreqDist, self).update(*args, **kwargs)
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def setdefault(self, key, val):
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"""
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Override ``Counter.setdefault()`` to invalidate the cached N
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"""
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self._N = None
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super(FreqDist, self).setdefault(key, val)
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def B(self):
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"""
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Return the total number of sample values (or "bins") that
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have counts greater than zero. For the total
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number of sample outcomes recorded, use ``FreqDist.N()``.
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(FreqDist.B() is the same as len(FreqDist).)
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:rtype: int
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"""
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return len(self)
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def hapaxes(self):
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"""
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Return a list of all samples that occur once (hapax legomena)
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:rtype: list
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"""
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return [item for item in self if self[item] == 1]
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def Nr(self, r, bins=None):
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return self.r_Nr(bins)[r]
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def r_Nr(self, bins=None):
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"""
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Return the dictionary mapping r to Nr, the number of samples with frequency r, where Nr > 0.
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:type bins: int
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:param bins: The number of possible sample outcomes. ``bins``
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is used to calculate Nr(0). In particular, Nr(0) is
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``bins-self.B()``. If ``bins`` is not specified, it
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defaults to ``self.B()`` (so Nr(0) will be 0).
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:rtype: int
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"""
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_r_Nr = defaultdict(int)
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for count in self.values():
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_r_Nr[count] += 1
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# Special case for Nr[0]:
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_r_Nr[0] = bins - self.B() if bins is not None else 0
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return _r_Nr
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def _cumulative_frequencies(self, samples):
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"""
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Return the cumulative frequencies of the specified samples.
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If no samples are specified, all counts are returned, starting
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with the largest.
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:param samples: the samples whose frequencies should be returned.
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:type samples: any
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:rtype: list(float)
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"""
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cf = 0.0
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for sample in samples:
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cf += self[sample]
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yield cf
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# slightly odd nomenclature freq() if FreqDist does counts and ProbDist does probs,
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# here, freq() does probs
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def freq(self, sample):
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"""
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Return the frequency of a given sample. The frequency of a
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sample is defined as the count of that sample divided by the
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total number of sample outcomes that have been recorded by
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this FreqDist. The count of a sample is defined as the
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number of times that sample outcome was recorded by this
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FreqDist. Frequencies are always real numbers in the range
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[0, 1].
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:param sample: the sample whose frequency
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should be returned.
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:type sample: any
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:rtype: float
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"""
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n = self.N()
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if n == 0:
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return 0
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return self[sample] / n
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def max(self):
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"""
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Return the sample with the greatest number of outcomes in this
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frequency distribution. If two or more samples have the same
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number of outcomes, return one of them; which sample is
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returned is undefined. If no outcomes have occurred in this
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frequency distribution, return None.
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:return: The sample with the maximum number of outcomes in this
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frequency distribution.
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:rtype: any or None
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"""
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if len(self) == 0:
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raise ValueError(
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'A FreqDist must have at least one sample before max is defined.'
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)
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return self.most_common(1)[0][0]
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def plot(self, *args, **kwargs):
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"""
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Plot samples from the frequency distribution
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displaying the most frequent sample first. If an integer
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parameter is supplied, stop after this many samples have been
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plotted. For a cumulative plot, specify cumulative=True.
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(Requires Matplotlib to be installed.)
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:param title: The title for the graph
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:type title: str
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:param cumulative: A flag to specify whether the plot is cumulative (default = False)
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:type title: bool
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"""
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try:
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from matplotlib import pylab
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except ImportError:
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raise ValueError(
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'The plot function requires matplotlib to be installed.'
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'See http://matplotlib.org/'
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)
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if len(args) == 0:
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args = [len(self)]
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samples = [item for item, _ in self.most_common(*args)]
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cumulative = _get_kwarg(kwargs, 'cumulative', False)
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percents = _get_kwarg(kwargs, 'percents', False)
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if cumulative:
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freqs = list(self._cumulative_frequencies(samples))
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ylabel = "Cumulative Counts"
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if percents:
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freqs = [f / freqs[len(freqs) - 1] * 100 for f in freqs]
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ylabel = "Cumulative Percents"
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else:
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freqs = [self[sample] for sample in samples]
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ylabel = "Counts"
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# percents = [f * 100 for f in freqs] only in ProbDist?
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pylab.grid(True, color="silver")
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if "linewidth" not in kwargs:
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kwargs["linewidth"] = 2
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if "title" in kwargs:
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pylab.title(kwargs["title"])
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del kwargs["title"]
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pylab.plot(freqs, **kwargs)
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pylab.xticks(range(len(samples)), [text_type(s) for s in samples], rotation=90)
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pylab.xlabel("Samples")
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pylab.ylabel(ylabel)
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pylab.show()
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def tabulate(self, *args, **kwargs):
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"""
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Tabulate the given samples from the frequency distribution (cumulative),
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displaying the most frequent sample first. If an integer
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parameter is supplied, stop after this many samples have been
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plotted.
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:param samples: The samples to plot (default is all samples)
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:type samples: list
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:param cumulative: A flag to specify whether the freqs are cumulative (default = False)
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:type title: bool
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"""
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if len(args) == 0:
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args = [len(self)]
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samples = [item for item, _ in self.most_common(*args)]
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cumulative = _get_kwarg(kwargs, 'cumulative', False)
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if cumulative:
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freqs = list(self._cumulative_frequencies(samples))
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else:
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freqs = [self[sample] for sample in samples]
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# percents = [f * 100 for f in freqs] only in ProbDist?
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width = max(len("%s" % s) for s in samples)
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width = max(width, max(len("%d" % f) for f in freqs))
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for i in range(len(samples)):
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print("%*s" % (width, samples[i]), end=' ')
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print()
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for i in range(len(samples)):
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print("%*d" % (width, freqs[i]), end=' ')
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print()
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def copy(self):
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"""
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Create a copy of this frequency distribution.
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:rtype: FreqDist
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"""
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return self.__class__(self)
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# Mathematical operatiors
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def __add__(self, other):
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"""
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Add counts from two counters.
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>>> FreqDist('abbb') + FreqDist('bcc')
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FreqDist({'b': 4, 'c': 2, 'a': 1})
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"""
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return self.__class__(super(FreqDist, self).__add__(other))
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def __sub__(self, other):
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"""
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Subtract count, but keep only results with positive counts.
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>>> FreqDist('abbbc') - FreqDist('bccd')
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FreqDist({'b': 2, 'a': 1})
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"""
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return self.__class__(super(FreqDist, self).__sub__(other))
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def __or__(self, other):
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"""
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Union is the maximum of value in either of the input counters.
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>>> FreqDist('abbb') | FreqDist('bcc')
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FreqDist({'b': 3, 'c': 2, 'a': 1})
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"""
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return self.__class__(super(FreqDist, self).__or__(other))
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def __and__(self, other):
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"""
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Intersection is the minimum of corresponding counts.
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>>> FreqDist('abbb') & FreqDist('bcc')
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FreqDist({'b': 1})
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"""
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return self.__class__(super(FreqDist, self).__and__(other))
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def __le__(self, other):
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if not isinstance(other, FreqDist):
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raise_unorderable_types("<=", self, other)
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return set(self).issubset(other) and all(
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self[key] <= other[key] for key in self
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)
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# @total_ordering doesn't work here, since the class inherits from a builtin class
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__ge__ = lambda self, other: not self <= other or self == other
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__lt__ = lambda self, other: self <= other and not self == other
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__gt__ = lambda self, other: not self <= other
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def __repr__(self):
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"""
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Return a string representation of this FreqDist.
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:rtype: string
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"""
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return self.pformat()
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def pprint(self, maxlen=10, stream=None):
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"""
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Print a string representation of this FreqDist to 'stream'
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:param maxlen: The maximum number of items to print
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:type maxlen: int
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:param stream: The stream to print to. stdout by default
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"""
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print(self.pformat(maxlen=maxlen), file=stream)
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def pformat(self, maxlen=10):
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"""
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Return a string representation of this FreqDist.
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:param maxlen: The maximum number of items to display
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:type maxlen: int
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:rtype: string
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"""
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items = ['{0!r}: {1!r}'.format(*item) for item in self.most_common(maxlen)]
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if len(self) > maxlen:
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items.append('...')
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return 'FreqDist({{{0}}})'.format(', '.join(items))
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def __str__(self):
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"""
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Return a string representation of this FreqDist.
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:rtype: string
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"""
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return '<FreqDist with %d samples and %d outcomes>' % (len(self), self.N())
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##//////////////////////////////////////////////////////
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## Probability Distributions
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##//////////////////////////////////////////////////////
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@add_metaclass(ABCMeta)
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class ProbDistI(object):
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"""
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A probability distribution for the outcomes of an experiment. A
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probability distribution specifies how likely it is that an
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experiment will have any given outcome. For example, a
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probability distribution could be used to predict the probability
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that a token in a document will have a given type. Formally, a
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probability distribution can be defined as a function mapping from
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samples to nonnegative real numbers, such that the sum of every
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number in the function's range is 1.0. A ``ProbDist`` is often
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used to model the probability distribution of the experiment used
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to generate a frequency distribution.
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"""
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SUM_TO_ONE = True
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"""True if the probabilities of the samples in this probability
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distribution will always sum to one."""
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@abstractmethod
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def __init__(self):
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"""
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Classes inheriting from ProbDistI should implement __init__.
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"""
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@abstractmethod
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def prob(self, sample):
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"""
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Return the probability for a given sample. Probabilities
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are always real numbers in the range [0, 1].
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:param sample: The sample whose probability
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should be returned.
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:type sample: any
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:rtype: float
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"""
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def logprob(self, sample):
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"""
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Return the base 2 logarithm of the probability for a given sample.
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:param sample: The sample whose probability
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should be returned.
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:type sample: any
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:rtype: float
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"""
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# Default definition, in terms of prob()
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p = self.prob(sample)
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return math.log(p, 2) if p != 0 else _NINF
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|
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@abstractmethod
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def max(self):
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"""
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Return the sample with the greatest probability. If two or
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more samples have the same probability, return one of them;
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which sample is returned is undefined.
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:rtype: any
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"""
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@abstractmethod
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def samples(self):
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"""
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Return a list of all samples that have nonzero probabilities.
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Use ``prob`` to find the probability of each sample.
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:rtype: list
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"""
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# cf self.SUM_TO_ONE
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def discount(self):
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"""
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Return the ratio by which counts are discounted on average: c*/c
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:rtype: float
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"""
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return 0.0
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|
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# Subclasses should define more efficient implementations of this,
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# where possible.
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def generate(self):
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"""
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Return a randomly selected sample from this probability distribution.
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The probability of returning each sample ``samp`` is equal to
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``self.prob(samp)``.
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"""
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p = random.random()
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p_init = p
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for sample in self.samples():
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p -= self.prob(sample)
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if p <= 0:
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return sample
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# allow for some rounding error:
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if p < 0.0001:
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return sample
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# we *should* never get here
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if self.SUM_TO_ONE:
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warnings.warn(
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"Probability distribution %r sums to %r; generate()"
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" is returning an arbitrary sample." % (self, p_init - p)
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)
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return random.choice(list(self.samples()))
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|
|
|
|
@compat.python_2_unicode_compatible
|
|
class UniformProbDist(ProbDistI):
|
|
"""
|
|
A probability distribution that assigns equal probability to each
|
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sample in a given set; and a zero probability to all other
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samples.
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"""
|
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|
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def __init__(self, samples):
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"""
|
|
Construct a new uniform probability distribution, that assigns
|
|
equal probability to each sample in ``samples``.
|
|
|
|
:param samples: The samples that should be given uniform
|
|
probability.
|
|
:type samples: list
|
|
:raise ValueError: If ``samples`` is empty.
|
|
"""
|
|
if len(samples) == 0:
|
|
raise ValueError(
|
|
'A Uniform probability distribution must ' + 'have at least one sample.'
|
|
)
|
|
self._sampleset = set(samples)
|
|
self._prob = 1.0 / len(self._sampleset)
|
|
self._samples = list(self._sampleset)
|
|
|
|
def prob(self, sample):
|
|
return self._prob if sample in self._sampleset else 0
|
|
|
|
def max(self):
|
|
return self._samples[0]
|
|
|
|
def samples(self):
|
|
return self._samples
|
|
|
|
def __repr__(self):
|
|
return '<UniformProbDist with %d samples>' % len(self._sampleset)
|
|
|
|
|
|
@compat.python_2_unicode_compatible
|
|
class RandomProbDist(ProbDistI):
|
|
"""
|
|
Generates a random probability distribution whereby each sample
|
|
will be between 0 and 1 with equal probability (uniform random distribution.
|
|
Also called a continuous uniform distribution).
|
|
"""
|
|
|
|
def __init__(self, samples):
|
|
if len(samples) == 0:
|
|
raise ValueError(
|
|
'A probability distribution must ' + 'have at least one sample.'
|
|
)
|
|
self._probs = self.unirand(samples)
|
|
self._samples = list(self._probs.keys())
|
|
|
|
@classmethod
|
|
def unirand(cls, samples):
|
|
"""
|
|
The key function that creates a randomized initial distribution
|
|
that still sums to 1. Set as a dictionary of prob values so that
|
|
it can still be passed to MutableProbDist and called with identical
|
|
syntax to UniformProbDist
|
|
"""
|
|
samples = set(samples)
|
|
randrow = [random.random() for i in range(len(samples))]
|
|
total = sum(randrow)
|
|
for i, x in enumerate(randrow):
|
|
randrow[i] = x / total
|
|
|
|
total = sum(randrow)
|
|
if total != 1:
|
|
# this difference, if present, is so small (near NINF) that it
|
|
# can be subtracted from any element without risking probs not (0 1)
|
|
randrow[-1] -= total - 1
|
|
|
|
return dict((s, randrow[i]) for i, s in enumerate(samples))
|
|
|
|
def max(self):
|
|
if not hasattr(self, '_max'):
|
|
self._max = max((p, v) for (v, p) in self._probs.items())[1]
|
|
return self._max
|
|
|
|
def prob(self, sample):
|
|
return self._probs.get(sample, 0)
|
|
|
|
def samples(self):
|
|
return self._samples
|
|
|
|
def __repr__(self):
|
|
return '<RandomUniformProbDist with %d samples>' % len(self._probs)
|
|
|
|
|
|
@compat.python_2_unicode_compatible
|
|
class DictionaryProbDist(ProbDistI):
|
|
"""
|
|
A probability distribution whose probabilities are directly
|
|
specified by a given dictionary. The given dictionary maps
|
|
samples to probabilities.
|
|
"""
|
|
|
|
def __init__(self, prob_dict=None, log=False, normalize=False):
|
|
"""
|
|
Construct a new probability distribution from the given
|
|
dictionary, which maps values to probabilities (or to log
|
|
probabilities, if ``log`` is true). If ``normalize`` is
|
|
true, then the probability values are scaled by a constant
|
|
factor such that they sum to 1.
|
|
|
|
If called without arguments, the resulting probability
|
|
distribution assigns zero probability to all values.
|
|
"""
|
|
|
|
self._prob_dict = prob_dict.copy() if prob_dict is not None else {}
|
|
self._log = log
|
|
|
|
# Normalize the distribution, if requested.
|
|
if normalize:
|
|
if len(prob_dict) == 0:
|
|
raise ValueError(
|
|
'A DictionaryProbDist must have at least one sample '
|
|
+ 'before it can be normalized.'
|
|
)
|
|
if log:
|
|
value_sum = sum_logs(list(self._prob_dict.values()))
|
|
if value_sum <= _NINF:
|
|
logp = math.log(1.0 / len(prob_dict), 2)
|
|
for x in prob_dict:
|
|
self._prob_dict[x] = logp
|
|
else:
|
|
for (x, p) in self._prob_dict.items():
|
|
self._prob_dict[x] -= value_sum
|
|
else:
|
|
value_sum = sum(self._prob_dict.values())
|
|
if value_sum == 0:
|
|
p = 1.0 / len(prob_dict)
|
|
for x in prob_dict:
|
|
self._prob_dict[x] = p
|
|
else:
|
|
norm_factor = 1.0 / value_sum
|
|
for (x, p) in self._prob_dict.items():
|
|
self._prob_dict[x] *= norm_factor
|
|
|
|
def prob(self, sample):
|
|
if self._log:
|
|
return 2 ** (self._prob_dict[sample]) if sample in self._prob_dict else 0
|
|
else:
|
|
return self._prob_dict.get(sample, 0)
|
|
|
|
def logprob(self, sample):
|
|
if self._log:
|
|
return self._prob_dict.get(sample, _NINF)
|
|
else:
|
|
if sample not in self._prob_dict:
|
|
return _NINF
|
|
elif self._prob_dict[sample] == 0:
|
|
return _NINF
|
|
else:
|
|
return math.log(self._prob_dict[sample], 2)
|
|
|
|
def max(self):
|
|
if not hasattr(self, '_max'):
|
|
self._max = max((p, v) for (v, p) in self._prob_dict.items())[1]
|
|
return self._max
|
|
|
|
def samples(self):
|
|
return self._prob_dict.keys()
|
|
|
|
def __repr__(self):
|
|
return '<ProbDist with %d samples>' % len(self._prob_dict)
|
|
|
|
|
|
@compat.python_2_unicode_compatible
|
|
class MLEProbDist(ProbDistI):
|
|
"""
|
|
The maximum likelihood estimate for the probability distribution
|
|
of the experiment used to generate a frequency distribution. The
|
|
"maximum likelihood estimate" approximates the probability of
|
|
each sample as the frequency of that sample in the frequency
|
|
distribution.
|
|
"""
|
|
|
|
def __init__(self, freqdist, bins=None):
|
|
"""
|
|
Use the maximum likelihood estimate to create a probability
|
|
distribution for the experiment used to generate ``freqdist``.
|
|
|
|
:type freqdist: FreqDist
|
|
:param freqdist: The frequency distribution that the
|
|
probability estimates should be based on.
|
|
"""
|
|
self._freqdist = freqdist
|
|
|
|
def freqdist(self):
|
|
"""
|
|
Return the frequency distribution that this probability
|
|
distribution is based on.
|
|
|
|
:rtype: FreqDist
|
|
"""
|
|
return self._freqdist
|
|
|
|
def prob(self, sample):
|
|
return self._freqdist.freq(sample)
|
|
|
|
def max(self):
|
|
return self._freqdist.max()
|
|
|
|
def samples(self):
|
|
return self._freqdist.keys()
|
|
|
|
def __repr__(self):
|
|
"""
|
|
:rtype: str
|
|
:return: A string representation of this ``ProbDist``.
|
|
"""
|
|
return '<MLEProbDist based on %d samples>' % self._freqdist.N()
|
|
|
|
|
|
@compat.python_2_unicode_compatible
|
|
class LidstoneProbDist(ProbDistI):
|
|
"""
|
|
The Lidstone estimate for the probability distribution of the
|
|
experiment used to generate a frequency distribution. The
|
|
"Lidstone estimate" is parameterized by a real number *gamma*,
|
|
which typically ranges from 0 to 1. The Lidstone estimate
|
|
approximates the probability of a sample with count *c* from an
|
|
experiment with *N* outcomes and *B* bins as
|
|
``c+gamma)/(N+B*gamma)``. This is equivalent to adding
|
|
*gamma* to the count for each bin, and taking the maximum
|
|
likelihood estimate of the resulting frequency distribution.
|
|
"""
|
|
|
|
SUM_TO_ONE = False
|
|
|
|
def __init__(self, freqdist, gamma, bins=None):
|
|
"""
|
|
Use the Lidstone estimate to create a probability distribution
|
|
for the experiment used to generate ``freqdist``.
|
|
|
|
:type freqdist: FreqDist
|
|
:param freqdist: The frequency distribution that the
|
|
probability estimates should be based on.
|
|
:type gamma: float
|
|
:param gamma: A real number used to parameterize the
|
|
estimate. The Lidstone estimate is equivalent to adding
|
|
*gamma* to the count for each bin, and taking the
|
|
maximum likelihood estimate of the resulting frequency
|
|
distribution.
|
|
:type bins: int
|
|
:param bins: The number of sample values that can be generated
|
|
by the experiment that is described by the probability
|
|
distribution. This value must be correctly set for the
|
|
probabilities of the sample values to sum to one. If
|
|
``bins`` is not specified, it defaults to ``freqdist.B()``.
|
|
"""
|
|
if (bins == 0) or (bins is None and freqdist.N() == 0):
|
|
name = self.__class__.__name__[:-8]
|
|
raise ValueError(
|
|
'A %s probability distribution ' % name + 'must have at least one bin.'
|
|
)
|
|
if (bins is not None) and (bins < freqdist.B()):
|
|
name = self.__class__.__name__[:-8]
|
|
raise ValueError(
|
|
'\nThe number of bins in a %s distribution ' % name
|
|
+ '(%d) must be greater than or equal to\n' % bins
|
|
+ 'the number of bins in the FreqDist used '
|
|
+ 'to create it (%d).' % freqdist.B()
|
|
)
|
|
|
|
self._freqdist = freqdist
|
|
self._gamma = float(gamma)
|
|
self._N = self._freqdist.N()
|
|
|
|
if bins is None:
|
|
bins = freqdist.B()
|
|
self._bins = bins
|
|
|
|
self._divisor = self._N + bins * gamma
|
|
if self._divisor == 0.0:
|
|
# In extreme cases we force the probability to be 0,
|
|
# which it will be, since the count will be 0:
|
|
self._gamma = 0
|
|
self._divisor = 1
|
|
|
|
def freqdist(self):
|
|
"""
|
|
Return the frequency distribution that this probability
|
|
distribution is based on.
|
|
|
|
:rtype: FreqDist
|
|
"""
|
|
return self._freqdist
|
|
|
|
def prob(self, sample):
|
|
c = self._freqdist[sample]
|
|
return (c + self._gamma) / self._divisor
|
|
|
|
def max(self):
|
|
# For Lidstone distributions, probability is monotonic with
|
|
# frequency, so the most probable sample is the one that
|
|
# occurs most frequently.
|
|
return self._freqdist.max()
|
|
|
|
def samples(self):
|
|
return self._freqdist.keys()
|
|
|
|
def discount(self):
|
|
gb = self._gamma * self._bins
|
|
return gb / (self._N + gb)
|
|
|
|
def __repr__(self):
|
|
"""
|
|
Return a string representation of this ``ProbDist``.
|
|
|
|
:rtype: str
|
|
"""
|
|
return '<LidstoneProbDist based on %d samples>' % self._freqdist.N()
|
|
|
|
|
|
@compat.python_2_unicode_compatible
|
|
class LaplaceProbDist(LidstoneProbDist):
|
|
"""
|
|
The Laplace estimate for the probability distribution of the
|
|
experiment used to generate a frequency distribution. The
|
|
"Laplace estimate" approximates the probability of a sample with
|
|
count *c* from an experiment with *N* outcomes and *B* bins as
|
|
*(c+1)/(N+B)*. This is equivalent to adding one to the count for
|
|
each bin, and taking the maximum likelihood estimate of the
|
|
resulting frequency distribution.
|
|
"""
|
|
|
|
def __init__(self, freqdist, bins=None):
|
|
"""
|
|
Use the Laplace estimate to create a probability distribution
|
|
for the experiment used to generate ``freqdist``.
|
|
|
|
:type freqdist: FreqDist
|
|
:param freqdist: The frequency distribution that the
|
|
probability estimates should be based on.
|
|
:type bins: int
|
|
:param bins: The number of sample values that can be generated
|
|
by the experiment that is described by the probability
|
|
distribution. This value must be correctly set for the
|
|
probabilities of the sample values to sum to one. If
|
|
``bins`` is not specified, it defaults to ``freqdist.B()``.
|
|
"""
|
|
LidstoneProbDist.__init__(self, freqdist, 1, bins)
|
|
|
|
def __repr__(self):
|
|
"""
|
|
:rtype: str
|
|
:return: A string representation of this ``ProbDist``.
|
|
"""
|
|
return '<LaplaceProbDist based on %d samples>' % self._freqdist.N()
|
|
|
|
|
|
@compat.python_2_unicode_compatible
|
|
class ELEProbDist(LidstoneProbDist):
|
|
"""
|
|
The expected likelihood estimate for the probability distribution
|
|
of the experiment used to generate a frequency distribution. The
|
|
"expected likelihood estimate" approximates the probability of a
|
|
sample with count *c* from an experiment with *N* outcomes and
|
|
*B* bins as *(c+0.5)/(N+B/2)*. This is equivalent to adding 0.5
|
|
to the count for each bin, and taking the maximum likelihood
|
|
estimate of the resulting frequency distribution.
|
|
"""
|
|
|
|
def __init__(self, freqdist, bins=None):
|
|
"""
|
|
Use the expected likelihood estimate to create a probability
|
|
distribution for the experiment used to generate ``freqdist``.
|
|
|
|
:type freqdist: FreqDist
|
|
:param freqdist: The frequency distribution that the
|
|
probability estimates should be based on.
|
|
:type bins: int
|
|
:param bins: The number of sample values that can be generated
|
|
by the experiment that is described by the probability
|
|
distribution. This value must be correctly set for the
|
|
probabilities of the sample values to sum to one. If
|
|
``bins`` is not specified, it defaults to ``freqdist.B()``.
|
|
"""
|
|
LidstoneProbDist.__init__(self, freqdist, 0.5, bins)
|
|
|
|
def __repr__(self):
|
|
"""
|
|
Return a string representation of this ``ProbDist``.
|
|
|
|
:rtype: str
|
|
"""
|
|
return '<ELEProbDist based on %d samples>' % self._freqdist.N()
|
|
|
|
|
|
@compat.python_2_unicode_compatible
|
|
class HeldoutProbDist(ProbDistI):
|
|
"""
|
|
The heldout estimate for the probability distribution of the
|
|
experiment used to generate two frequency distributions. These
|
|
two frequency distributions are called the "heldout frequency
|
|
distribution" and the "base frequency distribution." The
|
|
"heldout estimate" uses uses the "heldout frequency
|
|
distribution" to predict the probability of each sample, given its
|
|
frequency in the "base frequency distribution".
|
|
|
|
In particular, the heldout estimate approximates the probability
|
|
for a sample that occurs *r* times in the base distribution as
|
|
the average frequency in the heldout distribution of all samples
|
|
that occur *r* times in the base distribution.
|
|
|
|
This average frequency is *Tr[r]/(Nr[r].N)*, where:
|
|
|
|
- *Tr[r]* is the total count in the heldout distribution for
|
|
all samples that occur *r* times in the base distribution.
|
|
- *Nr[r]* is the number of samples that occur *r* times in
|
|
the base distribution.
|
|
- *N* is the number of outcomes recorded by the heldout
|
|
frequency distribution.
|
|
|
|
In order to increase the efficiency of the ``prob`` member
|
|
function, *Tr[r]/(Nr[r].N)* is precomputed for each value of *r*
|
|
when the ``HeldoutProbDist`` is created.
|
|
|
|
:type _estimate: list(float)
|
|
:ivar _estimate: A list mapping from *r*, the number of
|
|
times that a sample occurs in the base distribution, to the
|
|
probability estimate for that sample. ``_estimate[r]`` is
|
|
calculated by finding the average frequency in the heldout
|
|
distribution of all samples that occur *r* times in the base
|
|
distribution. In particular, ``_estimate[r]`` =
|
|
*Tr[r]/(Nr[r].N)*.
|
|
:type _max_r: int
|
|
:ivar _max_r: The maximum number of times that any sample occurs
|
|
in the base distribution. ``_max_r`` is used to decide how
|
|
large ``_estimate`` must be.
|
|
"""
|
|
|
|
SUM_TO_ONE = False
|
|
|
|
def __init__(self, base_fdist, heldout_fdist, bins=None):
|
|
"""
|
|
Use the heldout estimate to create a probability distribution
|
|
for the experiment used to generate ``base_fdist`` and
|
|
``heldout_fdist``.
|
|
|
|
:type base_fdist: FreqDist
|
|
:param base_fdist: The base frequency distribution.
|
|
:type heldout_fdist: FreqDist
|
|
:param heldout_fdist: The heldout frequency distribution.
|
|
:type bins: int
|
|
:param bins: The number of sample values that can be generated
|
|
by the experiment that is described by the probability
|
|
distribution. This value must be correctly set for the
|
|
probabilities of the sample values to sum to one. If
|
|
``bins`` is not specified, it defaults to ``freqdist.B()``.
|
|
"""
|
|
|
|
self._base_fdist = base_fdist
|
|
self._heldout_fdist = heldout_fdist
|
|
|
|
# The max number of times any sample occurs in base_fdist.
|
|
self._max_r = base_fdist[base_fdist.max()]
|
|
|
|
# Calculate Tr, Nr, and N.
|
|
Tr = self._calculate_Tr()
|
|
r_Nr = base_fdist.r_Nr(bins)
|
|
Nr = [r_Nr[r] for r in range(self._max_r + 1)]
|
|
N = heldout_fdist.N()
|
|
|
|
# Use Tr, Nr, and N to compute the probability estimate for
|
|
# each value of r.
|
|
self._estimate = self._calculate_estimate(Tr, Nr, N)
|
|
|
|
def _calculate_Tr(self):
|
|
"""
|
|
Return the list *Tr*, where *Tr[r]* is the total count in
|
|
``heldout_fdist`` for all samples that occur *r*
|
|
times in ``base_fdist``.
|
|
|
|
:rtype: list(float)
|
|
"""
|
|
Tr = [0.0] * (self._max_r + 1)
|
|
for sample in self._heldout_fdist:
|
|
r = self._base_fdist[sample]
|
|
Tr[r] += self._heldout_fdist[sample]
|
|
return Tr
|
|
|
|
def _calculate_estimate(self, Tr, Nr, N):
|
|
"""
|
|
Return the list *estimate*, where *estimate[r]* is the probability
|
|
estimate for any sample that occurs *r* times in the base frequency
|
|
distribution. In particular, *estimate[r]* is *Tr[r]/(N[r].N)*.
|
|
In the special case that *N[r]=0*, *estimate[r]* will never be used;
|
|
so we define *estimate[r]=None* for those cases.
|
|
|
|
:rtype: list(float)
|
|
:type Tr: list(float)
|
|
:param Tr: the list *Tr*, where *Tr[r]* is the total count in
|
|
the heldout distribution for all samples that occur *r*
|
|
times in base distribution.
|
|
:type Nr: list(float)
|
|
:param Nr: The list *Nr*, where *Nr[r]* is the number of
|
|
samples that occur *r* times in the base distribution.
|
|
:type N: int
|
|
:param N: The total number of outcomes recorded by the heldout
|
|
frequency distribution.
|
|
"""
|
|
estimate = []
|
|
for r in range(self._max_r + 1):
|
|
if Nr[r] == 0:
|
|
estimate.append(None)
|
|
else:
|
|
estimate.append(Tr[r] / (Nr[r] * N))
|
|
return estimate
|
|
|
|
def base_fdist(self):
|
|
"""
|
|
Return the base frequency distribution that this probability
|
|
distribution is based on.
|
|
|
|
:rtype: FreqDist
|
|
"""
|
|
return self._base_fdist
|
|
|
|
def heldout_fdist(self):
|
|
"""
|
|
Return the heldout frequency distribution that this
|
|
probability distribution is based on.
|
|
|
|
:rtype: FreqDist
|
|
"""
|
|
return self._heldout_fdist
|
|
|
|
def samples(self):
|
|
return self._base_fdist.keys()
|
|
|
|
def prob(self, sample):
|
|
# Use our precomputed probability estimate.
|
|
r = self._base_fdist[sample]
|
|
return self._estimate[r]
|
|
|
|
def max(self):
|
|
# Note: the Heldout estimation is *not* necessarily monotonic;
|
|
# so this implementation is currently broken. However, it
|
|
# should give the right answer *most* of the time. :)
|
|
return self._base_fdist.max()
|
|
|
|
def discount(self):
|
|
raise NotImplementedError()
|
|
|
|
def __repr__(self):
|
|
"""
|
|
:rtype: str
|
|
:return: A string representation of this ``ProbDist``.
|
|
"""
|
|
s = '<HeldoutProbDist: %d base samples; %d heldout samples>'
|
|
return s % (self._base_fdist.N(), self._heldout_fdist.N())
|
|
|
|
|
|
@compat.python_2_unicode_compatible
|
|
class CrossValidationProbDist(ProbDistI):
|
|
"""
|
|
The cross-validation estimate for the probability distribution of
|
|
the experiment used to generate a set of frequency distribution.
|
|
The "cross-validation estimate" for the probability of a sample
|
|
is found by averaging the held-out estimates for the sample in
|
|
each pair of frequency distributions.
|
|
"""
|
|
|
|
SUM_TO_ONE = False
|
|
|
|
def __init__(self, freqdists, bins):
|
|
"""
|
|
Use the cross-validation estimate to create a probability
|
|
distribution for the experiment used to generate
|
|
``freqdists``.
|
|
|
|
:type freqdists: list(FreqDist)
|
|
:param freqdists: A list of the frequency distributions
|
|
generated by the experiment.
|
|
:type bins: int
|
|
:param bins: The number of sample values that can be generated
|
|
by the experiment that is described by the probability
|
|
distribution. This value must be correctly set for the
|
|
probabilities of the sample values to sum to one. If
|
|
``bins`` is not specified, it defaults to ``freqdist.B()``.
|
|
"""
|
|
self._freqdists = freqdists
|
|
|
|
# Create a heldout probability distribution for each pair of
|
|
# frequency distributions in freqdists.
|
|
self._heldout_probdists = []
|
|
for fdist1 in freqdists:
|
|
for fdist2 in freqdists:
|
|
if fdist1 is not fdist2:
|
|
probdist = HeldoutProbDist(fdist1, fdist2, bins)
|
|
self._heldout_probdists.append(probdist)
|
|
|
|
def freqdists(self):
|
|
"""
|
|
Return the list of frequency distributions that this ``ProbDist`` is based on.
|
|
|
|
:rtype: list(FreqDist)
|
|
"""
|
|
return self._freqdists
|
|
|
|
def samples(self):
|
|
# [xx] nb: this is not too efficient
|
|
return set(sum([list(fd) for fd in self._freqdists], []))
|
|
|
|
def prob(self, sample):
|
|
# Find the average probability estimate returned by each
|
|
# heldout distribution.
|
|
prob = 0.0
|
|
for heldout_probdist in self._heldout_probdists:
|
|
prob += heldout_probdist.prob(sample)
|
|
return prob / len(self._heldout_probdists)
|
|
|
|
def discount(self):
|
|
raise NotImplementedError()
|
|
|
|
def __repr__(self):
|
|
"""
|
|
Return a string representation of this ``ProbDist``.
|
|
|
|
:rtype: str
|
|
"""
|
|
return '<CrossValidationProbDist: %d-way>' % len(self._freqdists)
|
|
|
|
|
|
@compat.python_2_unicode_compatible
|
|
class WittenBellProbDist(ProbDistI):
|
|
"""
|
|
The Witten-Bell estimate of a probability distribution. This distribution
|
|
allocates uniform probability mass to as yet unseen events by using the
|
|
number of events that have only been seen once. The probability mass
|
|
reserved for unseen events is equal to *T / (N + T)*
|
|
where *T* is the number of observed event types and *N* is the total
|
|
number of observed events. This equates to the maximum likelihood estimate
|
|
of a new type event occurring. The remaining probability mass is discounted
|
|
such that all probability estimates sum to one, yielding:
|
|
|
|
- *p = T / Z (N + T)*, if count = 0
|
|
- *p = c / (N + T)*, otherwise
|
|
"""
|
|
|
|
def __init__(self, freqdist, bins=None):
|
|
"""
|
|
Creates a distribution of Witten-Bell probability estimates. This
|
|
distribution allocates uniform probability mass to as yet unseen
|
|
events by using the number of events that have only been seen once. The
|
|
probability mass reserved for unseen events is equal to *T / (N + T)*
|
|
where *T* is the number of observed event types and *N* is the total
|
|
number of observed events. This equates to the maximum likelihood
|
|
estimate of a new type event occurring. The remaining probability mass
|
|
is discounted such that all probability estimates sum to one,
|
|
yielding:
|
|
|
|
- *p = T / Z (N + T)*, if count = 0
|
|
- *p = c / (N + T)*, otherwise
|
|
|
|
The parameters *T* and *N* are taken from the ``freqdist`` parameter
|
|
(the ``B()`` and ``N()`` values). The normalizing factor *Z* is
|
|
calculated using these values along with the ``bins`` parameter.
|
|
|
|
:param freqdist: The frequency counts upon which to base the
|
|
estimation.
|
|
:type freqdist: FreqDist
|
|
:param bins: The number of possible event types. This must be at least
|
|
as large as the number of bins in the ``freqdist``. If None, then
|
|
it's assumed to be equal to that of the ``freqdist``
|
|
:type bins: int
|
|
"""
|
|
assert bins is None or bins >= freqdist.B(), (
|
|
'bins parameter must not be less than %d=freqdist.B()' % freqdist.B()
|
|
)
|
|
if bins is None:
|
|
bins = freqdist.B()
|
|
self._freqdist = freqdist
|
|
self._T = self._freqdist.B()
|
|
self._Z = bins - self._freqdist.B()
|
|
self._N = self._freqdist.N()
|
|
# self._P0 is P(0), precalculated for efficiency:
|
|
if self._N == 0:
|
|
# if freqdist is empty, we approximate P(0) by a UniformProbDist:
|
|
self._P0 = 1.0 / self._Z
|
|
else:
|
|
self._P0 = self._T / (self._Z * (self._N + self._T))
|
|
|
|
def prob(self, sample):
|
|
# inherit docs from ProbDistI
|
|
c = self._freqdist[sample]
|
|
return c / (self._N + self._T) if c != 0 else self._P0
|
|
|
|
def max(self):
|
|
return self._freqdist.max()
|
|
|
|
def samples(self):
|
|
return self._freqdist.keys()
|
|
|
|
def freqdist(self):
|
|
return self._freqdist
|
|
|
|
def discount(self):
|
|
raise NotImplementedError()
|
|
|
|
def __repr__(self):
|
|
"""
|
|
Return a string representation of this ``ProbDist``.
|
|
|
|
:rtype: str
|
|
"""
|
|
return '<WittenBellProbDist based on %d samples>' % self._freqdist.N()
|
|
|
|
|
|
##//////////////////////////////////////////////////////
|
|
## Good-Turing Probability Distributions
|
|
##//////////////////////////////////////////////////////
|
|
|
|
# Good-Turing frequency estimation was contributed by Alan Turing and
|
|
# his statistical assistant I.J. Good, during their collaboration in
|
|
# the WWII. It is a statistical technique for predicting the
|
|
# probability of occurrence of objects belonging to an unknown number
|
|
# of species, given past observations of such objects and their
|
|
# species. (In drawing balls from an urn, the 'objects' would be balls
|
|
# and the 'species' would be the distinct colors of the balls (finite
|
|
# but unknown in number).
|
|
#
|
|
# Good-Turing method calculates the probability mass to assign to
|
|
# events with zero or low counts based on the number of events with
|
|
# higher counts. It does so by using the adjusted count *c\**:
|
|
#
|
|
# - *c\* = (c + 1) N(c + 1) / N(c)* for c >= 1
|
|
# - *things with frequency zero in training* = N(1) for c == 0
|
|
#
|
|
# where *c* is the original count, *N(i)* is the number of event types
|
|
# observed with count *i*. We can think the count of unseen as the count
|
|
# of frequency one (see Jurafsky & Martin 2nd Edition, p101).
|
|
#
|
|
# This method is problematic because the situation ``N(c+1) == 0``
|
|
# is quite common in the original Good-Turing estimation; smoothing or
|
|
# interpolation of *N(i)* values is essential in practice.
|
|
#
|
|
# Bill Gale and Geoffrey Sampson present a simple and effective approach,
|
|
# Simple Good-Turing. As a smoothing curve they simply use a power curve:
|
|
#
|
|
# Nr = a*r^b (with b < -1 to give the appropriate hyperbolic
|
|
# relationship)
|
|
#
|
|
# They estimate a and b by simple linear regression technique on the
|
|
# logarithmic form of the equation:
|
|
#
|
|
# log Nr = a + b*log(r)
|
|
#
|
|
# However, they suggest that such a simple curve is probably only
|
|
# appropriate for high values of r. For low values of r, they use the
|
|
# measured Nr directly. (see M&S, p.213)
|
|
#
|
|
# Gale and Sampson propose to use r while the difference between r and
|
|
# r* is 1.96 greater than the standard deviation, and switch to r* if
|
|
# it is less or equal:
|
|
#
|
|
# |r - r*| > 1.96 * sqrt((r + 1)^2 (Nr+1 / Nr^2) (1 + Nr+1 / Nr))
|
|
#
|
|
# The 1.96 coefficient correspond to a 0.05 significance criterion,
|
|
# some implementations can use a coefficient of 1.65 for a 0.1
|
|
# significance criterion.
|
|
#
|
|
|
|
##//////////////////////////////////////////////////////
|
|
## Simple Good-Turing Probablity Distributions
|
|
##//////////////////////////////////////////////////////
|
|
|
|
|
|
@compat.python_2_unicode_compatible
|
|
class SimpleGoodTuringProbDist(ProbDistI):
|
|
"""
|
|
SimpleGoodTuring ProbDist approximates from frequency to frequency of
|
|
frequency into a linear line under log space by linear regression.
|
|
Details of Simple Good-Turing algorithm can be found in:
|
|
|
|
- Good Turing smoothing without tears" (Gale & Sampson 1995),
|
|
Journal of Quantitative Linguistics, vol. 2 pp. 217-237.
|
|
- "Speech and Language Processing (Jurafsky & Martin),
|
|
2nd Edition, Chapter 4.5 p103 (log(Nc) = a + b*log(c))
|
|
- http://www.grsampson.net/RGoodTur.html
|
|
|
|
Given a set of pair (xi, yi), where the xi denotes the frequency and
|
|
yi denotes the frequency of frequency, we want to minimize their
|
|
square variation. E(x) and E(y) represent the mean of xi and yi.
|
|
|
|
- slope: b = sigma ((xi-E(x)(yi-E(y))) / sigma ((xi-E(x))(xi-E(x)))
|
|
- intercept: a = E(y) - b.E(x)
|
|
"""
|
|
|
|
SUM_TO_ONE = False
|
|
|
|
def __init__(self, freqdist, bins=None):
|
|
"""
|
|
:param freqdist: The frequency counts upon which to base the
|
|
estimation.
|
|
:type freqdist: FreqDist
|
|
:param bins: The number of possible event types. This must be
|
|
larger than the number of bins in the ``freqdist``. If None,
|
|
then it's assumed to be equal to ``freqdist``.B() + 1
|
|
:type bins: int
|
|
"""
|
|
assert (
|
|
bins is None or bins > freqdist.B()
|
|
), 'bins parameter must not be less than %d=freqdist.B()+1' % (freqdist.B() + 1)
|
|
if bins is None:
|
|
bins = freqdist.B() + 1
|
|
self._freqdist = freqdist
|
|
self._bins = bins
|
|
r, nr = self._r_Nr()
|
|
self.find_best_fit(r, nr)
|
|
self._switch(r, nr)
|
|
self._renormalize(r, nr)
|
|
|
|
def _r_Nr_non_zero(self):
|
|
r_Nr = self._freqdist.r_Nr()
|
|
del r_Nr[0]
|
|
return r_Nr
|
|
|
|
def _r_Nr(self):
|
|
"""
|
|
Split the frequency distribution in two list (r, Nr), where Nr(r) > 0
|
|
"""
|
|
nonzero = self._r_Nr_non_zero()
|
|
|
|
if not nonzero:
|
|
return [], []
|
|
return zip(*sorted(nonzero.items()))
|
|
|
|
def find_best_fit(self, r, nr):
|
|
"""
|
|
Use simple linear regression to tune parameters self._slope and
|
|
self._intercept in the log-log space based on count and Nr(count)
|
|
(Work in log space to avoid floating point underflow.)
|
|
"""
|
|
# For higher sample frequencies the data points becomes horizontal
|
|
# along line Nr=1. To create a more evident linear model in log-log
|
|
# space, we average positive Nr values with the surrounding zero
|
|
# values. (Church and Gale, 1991)
|
|
|
|
if not r or not nr:
|
|
# Empty r or nr?
|
|
return
|
|
|
|
zr = []
|
|
for j in range(len(r)):
|
|
i = r[j - 1] if j > 0 else 0
|
|
k = 2 * r[j] - i if j == len(r) - 1 else r[j + 1]
|
|
zr_ = 2.0 * nr[j] / (k - i)
|
|
zr.append(zr_)
|
|
|
|
log_r = [math.log(i) for i in r]
|
|
log_zr = [math.log(i) for i in zr]
|
|
|
|
xy_cov = x_var = 0.0
|
|
x_mean = sum(log_r) / len(log_r)
|
|
y_mean = sum(log_zr) / len(log_zr)
|
|
for (x, y) in zip(log_r, log_zr):
|
|
xy_cov += (x - x_mean) * (y - y_mean)
|
|
x_var += (x - x_mean) ** 2
|
|
self._slope = xy_cov / x_var if x_var != 0 else 0.0
|
|
if self._slope >= -1:
|
|
warnings.warn(
|
|
'SimpleGoodTuring did not find a proper best fit '
|
|
'line for smoothing probabilities of occurrences. '
|
|
'The probability estimates are likely to be '
|
|
'unreliable.'
|
|
)
|
|
self._intercept = y_mean - self._slope * x_mean
|
|
|
|
def _switch(self, r, nr):
|
|
"""
|
|
Calculate the r frontier where we must switch from Nr to Sr
|
|
when estimating E[Nr].
|
|
"""
|
|
for i, r_ in enumerate(r):
|
|
if len(r) == i + 1 or r[i + 1] != r_ + 1:
|
|
# We are at the end of r, or there is a gap in r
|
|
self._switch_at = r_
|
|
break
|
|
|
|
Sr = self.smoothedNr
|
|
smooth_r_star = (r_ + 1) * Sr(r_ + 1) / Sr(r_)
|
|
unsmooth_r_star = (r_ + 1) * nr[i + 1] / nr[i]
|
|
|
|
std = math.sqrt(self._variance(r_, nr[i], nr[i + 1]))
|
|
if abs(unsmooth_r_star - smooth_r_star) <= 1.96 * std:
|
|
self._switch_at = r_
|
|
break
|
|
|
|
def _variance(self, r, nr, nr_1):
|
|
r = float(r)
|
|
nr = float(nr)
|
|
nr_1 = float(nr_1)
|
|
return (r + 1.0) ** 2 * (nr_1 / nr ** 2) * (1.0 + nr_1 / nr)
|
|
|
|
def _renormalize(self, r, nr):
|
|
"""
|
|
It is necessary to renormalize all the probability estimates to
|
|
ensure a proper probability distribution results. This can be done
|
|
by keeping the estimate of the probability mass for unseen items as
|
|
N(1)/N and renormalizing all the estimates for previously seen items
|
|
(as Gale and Sampson (1995) propose). (See M&S P.213, 1999)
|
|
"""
|
|
prob_cov = 0.0
|
|
for r_, nr_ in zip(r, nr):
|
|
prob_cov += nr_ * self._prob_measure(r_)
|
|
if prob_cov:
|
|
self._renormal = (1 - self._prob_measure(0)) / prob_cov
|
|
|
|
def smoothedNr(self, r):
|
|
"""
|
|
Return the number of samples with count r.
|
|
|
|
:param r: The amount of frequency.
|
|
:type r: int
|
|
:rtype: float
|
|
"""
|
|
|
|
# Nr = a*r^b (with b < -1 to give the appropriate hyperbolic
|
|
# relationship)
|
|
# Estimate a and b by simple linear regression technique on
|
|
# the logarithmic form of the equation: log Nr = a + b*log(r)
|
|
|
|
return math.exp(self._intercept + self._slope * math.log(r))
|
|
|
|
def prob(self, sample):
|
|
"""
|
|
Return the sample's probability.
|
|
|
|
:param sample: sample of the event
|
|
:type sample: str
|
|
:rtype: float
|
|
"""
|
|
count = self._freqdist[sample]
|
|
p = self._prob_measure(count)
|
|
if count == 0:
|
|
if self._bins == self._freqdist.B():
|
|
p = 0.0
|
|
else:
|
|
p = p / (self._bins - self._freqdist.B())
|
|
else:
|
|
p = p * self._renormal
|
|
return p
|
|
|
|
def _prob_measure(self, count):
|
|
if count == 0 and self._freqdist.N() == 0:
|
|
return 1.0
|
|
elif count == 0 and self._freqdist.N() != 0:
|
|
return self._freqdist.Nr(1) / self._freqdist.N()
|
|
|
|
if self._switch_at > count:
|
|
Er_1 = self._freqdist.Nr(count + 1)
|
|
Er = self._freqdist.Nr(count)
|
|
else:
|
|
Er_1 = self.smoothedNr(count + 1)
|
|
Er = self.smoothedNr(count)
|
|
|
|
r_star = (count + 1) * Er_1 / Er
|
|
return r_star / self._freqdist.N()
|
|
|
|
def check(self):
|
|
prob_sum = 0.0
|
|
for i in range(0, len(self._Nr)):
|
|
prob_sum += self._Nr[i] * self._prob_measure(i) / self._renormal
|
|
print("Probability Sum:", prob_sum)
|
|
# assert prob_sum != 1.0, "probability sum should be one!"
|
|
|
|
def discount(self):
|
|
"""
|
|
This function returns the total mass of probability transfers from the
|
|
seen samples to the unseen samples.
|
|
"""
|
|
return self.smoothedNr(1) / self._freqdist.N()
|
|
|
|
def max(self):
|
|
return self._freqdist.max()
|
|
|
|
def samples(self):
|
|
return self._freqdist.keys()
|
|
|
|
def freqdist(self):
|
|
return self._freqdist
|
|
|
|
def __repr__(self):
|
|
"""
|
|
Return a string representation of this ``ProbDist``.
|
|
|
|
:rtype: str
|
|
"""
|
|
return '<SimpleGoodTuringProbDist based on %d samples>' % self._freqdist.N()
|
|
|
|
|
|
class MutableProbDist(ProbDistI):
|
|
"""
|
|
An mutable probdist where the probabilities may be easily modified. This
|
|
simply copies an existing probdist, storing the probability values in a
|
|
mutable dictionary and providing an update method.
|
|
"""
|
|
|
|
def __init__(self, prob_dist, samples, store_logs=True):
|
|
"""
|
|
Creates the mutable probdist based on the given prob_dist and using
|
|
the list of samples given. These values are stored as log
|
|
probabilities if the store_logs flag is set.
|
|
|
|
:param prob_dist: the distribution from which to garner the
|
|
probabilities
|
|
:type prob_dist: ProbDist
|
|
:param samples: the complete set of samples
|
|
:type samples: sequence of any
|
|
:param store_logs: whether to store the probabilities as logarithms
|
|
:type store_logs: bool
|
|
"""
|
|
self._samples = samples
|
|
self._sample_dict = dict((samples[i], i) for i in range(len(samples)))
|
|
self._data = array.array(str("d"), [0.0]) * len(samples)
|
|
for i in range(len(samples)):
|
|
if store_logs:
|
|
self._data[i] = prob_dist.logprob(samples[i])
|
|
else:
|
|
self._data[i] = prob_dist.prob(samples[i])
|
|
self._logs = store_logs
|
|
|
|
def max(self):
|
|
# inherit documentation
|
|
return max((p, v) for (v, p) in self._sample_dict.items())[1]
|
|
|
|
def samples(self):
|
|
# inherit documentation
|
|
return self._samples
|
|
|
|
def prob(self, sample):
|
|
# inherit documentation
|
|
i = self._sample_dict.get(sample)
|
|
if i is None:
|
|
return 0.0
|
|
return 2 ** (self._data[i]) if self._logs else self._data[i]
|
|
|
|
def logprob(self, sample):
|
|
# inherit documentation
|
|
i = self._sample_dict.get(sample)
|
|
if i is None:
|
|
return float('-inf')
|
|
return self._data[i] if self._logs else math.log(self._data[i], 2)
|
|
|
|
def update(self, sample, prob, log=True):
|
|
"""
|
|
Update the probability for the given sample. This may cause the object
|
|
to stop being the valid probability distribution - the user must
|
|
ensure that they update the sample probabilities such that all samples
|
|
have probabilities between 0 and 1 and that all probabilities sum to
|
|
one.
|
|
|
|
:param sample: the sample for which to update the probability
|
|
:type sample: any
|
|
:param prob: the new probability
|
|
:type prob: float
|
|
:param log: is the probability already logged
|
|
:type log: bool
|
|
"""
|
|
i = self._sample_dict.get(sample)
|
|
assert i is not None
|
|
if self._logs:
|
|
self._data[i] = prob if log else math.log(prob, 2)
|
|
else:
|
|
self._data[i] = 2 ** (prob) if log else prob
|
|
|
|
|
|
##/////////////////////////////////////////////////////
|
|
## Kneser-Ney Probability Distribution
|
|
##//////////////////////////////////////////////////////
|
|
|
|
# This method for calculating probabilities was introduced in 1995 by Reinhard
|
|
# Kneser and Hermann Ney. It was meant to improve the accuracy of language
|
|
# models that use backing-off to deal with sparse data. The authors propose two
|
|
# ways of doing so: a marginal distribution constraint on the back-off
|
|
# distribution and a leave-one-out distribution. For a start, the first one is
|
|
# implemented as a class below.
|
|
#
|
|
# The idea behind a back-off n-gram model is that we have a series of
|
|
# frequency distributions for our n-grams so that in case we have not seen a
|
|
# given n-gram during training (and as a result have a 0 probability for it) we
|
|
# can 'back off' (hence the name!) and try testing whether we've seen the
|
|
# n-1-gram part of the n-gram in training.
|
|
#
|
|
# The novelty of Kneser and Ney's approach was that they decided to fiddle
|
|
# around with the way this latter, backed off probability was being calculated
|
|
# whereas their peers seemed to focus on the primary probability.
|
|
#
|
|
# The implementation below uses one of the techniques described in their paper
|
|
# titled "Improved backing-off for n-gram language modeling." In the same paper
|
|
# another technique is introduced to attempt to smooth the back-off
|
|
# distribution as well as the primary one. There is also a much-cited
|
|
# modification of this method proposed by Chen and Goodman.
|
|
#
|
|
# In order for the implementation of Kneser-Ney to be more efficient, some
|
|
# changes have been made to the original algorithm. Namely, the calculation of
|
|
# the normalizing function gamma has been significantly simplified and
|
|
# combined slightly differently with beta. None of these changes affect the
|
|
# nature of the algorithm, but instead aim to cut out unnecessary calculations
|
|
# and take advantage of storing and retrieving information in dictionaries
|
|
# where possible.
|
|
|
|
|
|
@compat.python_2_unicode_compatible
|
|
class KneserNeyProbDist(ProbDistI):
|
|
"""
|
|
Kneser-Ney estimate of a probability distribution. This is a version of
|
|
back-off that counts how likely an n-gram is provided the n-1-gram had
|
|
been seen in training. Extends the ProbDistI interface, requires a trigram
|
|
FreqDist instance to train on. Optionally, a different from default discount
|
|
value can be specified. The default discount is set to 0.75.
|
|
|
|
"""
|
|
|
|
def __init__(self, freqdist, bins=None, discount=0.75):
|
|
"""
|
|
:param freqdist: The trigram frequency distribution upon which to base
|
|
the estimation
|
|
:type freqdist: FreqDist
|
|
:param bins: Included for compatibility with nltk.tag.hmm
|
|
:type bins: int or float
|
|
:param discount: The discount applied when retrieving counts of
|
|
trigrams
|
|
:type discount: float (preferred, but can be set to int)
|
|
"""
|
|
|
|
if not bins:
|
|
self._bins = freqdist.B()
|
|
else:
|
|
self._bins = bins
|
|
self._D = discount
|
|
|
|
# cache for probability calculation
|
|
self._cache = {}
|
|
|
|
# internal bigram and trigram frequency distributions
|
|
self._bigrams = defaultdict(int)
|
|
self._trigrams = freqdist
|
|
|
|
# helper dictionaries used to calculate probabilities
|
|
self._wordtypes_after = defaultdict(float)
|
|
self._trigrams_contain = defaultdict(float)
|
|
self._wordtypes_before = defaultdict(float)
|
|
for w0, w1, w2 in freqdist:
|
|
self._bigrams[(w0, w1)] += freqdist[(w0, w1, w2)]
|
|
self._wordtypes_after[(w0, w1)] += 1
|
|
self._trigrams_contain[w1] += 1
|
|
self._wordtypes_before[(w1, w2)] += 1
|
|
|
|
def prob(self, trigram):
|
|
# sample must be a triple
|
|
if len(trigram) != 3:
|
|
raise ValueError('Expected an iterable with 3 members.')
|
|
trigram = tuple(trigram)
|
|
w0, w1, w2 = trigram
|
|
|
|
if trigram in self._cache:
|
|
return self._cache[trigram]
|
|
else:
|
|
# if the sample trigram was seen during training
|
|
if trigram in self._trigrams:
|
|
prob = (self._trigrams[trigram] - self.discount()) / self._bigrams[
|
|
(w0, w1)
|
|
]
|
|
|
|
# else if the 'rougher' environment was seen during training
|
|
elif (w0, w1) in self._bigrams and (w1, w2) in self._wordtypes_before:
|
|
aftr = self._wordtypes_after[(w0, w1)]
|
|
bfr = self._wordtypes_before[(w1, w2)]
|
|
|
|
# the probability left over from alphas
|
|
leftover_prob = (aftr * self.discount()) / self._bigrams[(w0, w1)]
|
|
|
|
# the beta (including normalization)
|
|
beta = bfr / (self._trigrams_contain[w1] - aftr)
|
|
|
|
prob = leftover_prob * beta
|
|
|
|
# else the sample was completely unseen during training
|
|
else:
|
|
prob = 0.0
|
|
|
|
self._cache[trigram] = prob
|
|
return prob
|
|
|
|
def discount(self):
|
|
"""
|
|
Return the value by which counts are discounted. By default set to 0.75.
|
|
|
|
:rtype: float
|
|
"""
|
|
return self._D
|
|
|
|
def set_discount(self, discount):
|
|
"""
|
|
Set the value by which counts are discounted to the value of discount.
|
|
|
|
:param discount: the new value to discount counts by
|
|
:type discount: float (preferred, but int possible)
|
|
:rtype: None
|
|
"""
|
|
self._D = discount
|
|
|
|
def samples(self):
|
|
return self._trigrams.keys()
|
|
|
|
def max(self):
|
|
return self._trigrams.max()
|
|
|
|
def __repr__(self):
|
|
'''
|
|
Return a string representation of this ProbDist
|
|
|
|
:rtype: str
|
|
'''
|
|
return '<KneserNeyProbDist based on {0} trigrams'.format(self._trigrams.N())
|
|
|
|
|
|
##//////////////////////////////////////////////////////
|
|
## Probability Distribution Operations
|
|
##//////////////////////////////////////////////////////
|
|
|
|
|
|
def log_likelihood(test_pdist, actual_pdist):
|
|
if not isinstance(test_pdist, ProbDistI) or not isinstance(actual_pdist, ProbDistI):
|
|
raise ValueError('expected a ProbDist.')
|
|
# Is this right?
|
|
return sum(
|
|
actual_pdist.prob(s) * math.log(test_pdist.prob(s), 2) for s in actual_pdist
|
|
)
|
|
|
|
|
|
def entropy(pdist):
|
|
probs = (pdist.prob(s) for s in pdist.samples())
|
|
return -sum(p * math.log(p, 2) for p in probs)
|
|
|
|
|
|
##//////////////////////////////////////////////////////
|
|
## Conditional Distributions
|
|
##//////////////////////////////////////////////////////
|
|
|
|
|
|
@compat.python_2_unicode_compatible
|
|
class ConditionalFreqDist(defaultdict):
|
|
"""
|
|
A collection of frequency distributions for a single experiment
|
|
run under different conditions. Conditional frequency
|
|
distributions are used to record the number of times each sample
|
|
occurred, given the condition under which the experiment was run.
|
|
For example, a conditional frequency distribution could be used to
|
|
record the frequency of each word (type) in a document, given its
|
|
length. Formally, a conditional frequency distribution can be
|
|
defined as a function that maps from each condition to the
|
|
FreqDist for the experiment under that condition.
|
|
|
|
Conditional frequency distributions are typically constructed by
|
|
repeatedly running an experiment under a variety of conditions,
|
|
and incrementing the sample outcome counts for the appropriate
|
|
conditions. For example, the following code will produce a
|
|
conditional frequency distribution that encodes how often each
|
|
word type occurs, given the length of that word type:
|
|
|
|
>>> from nltk.probability import ConditionalFreqDist
|
|
>>> from nltk.tokenize import word_tokenize
|
|
>>> sent = "the the the dog dog some other words that we do not care about"
|
|
>>> cfdist = ConditionalFreqDist()
|
|
>>> for word in word_tokenize(sent):
|
|
... condition = len(word)
|
|
... cfdist[condition][word] += 1
|
|
|
|
An equivalent way to do this is with the initializer:
|
|
|
|
>>> cfdist = ConditionalFreqDist((len(word), word) for word in word_tokenize(sent))
|
|
|
|
The frequency distribution for each condition is accessed using
|
|
the indexing operator:
|
|
|
|
>>> cfdist[3]
|
|
FreqDist({'the': 3, 'dog': 2, 'not': 1})
|
|
>>> cfdist[3].freq('the')
|
|
0.5
|
|
>>> cfdist[3]['dog']
|
|
2
|
|
|
|
When the indexing operator is used to access the frequency
|
|
distribution for a condition that has not been accessed before,
|
|
``ConditionalFreqDist`` creates a new empty FreqDist for that
|
|
condition.
|
|
|
|
"""
|
|
|
|
def __init__(self, cond_samples=None):
|
|
"""
|
|
Construct a new empty conditional frequency distribution. In
|
|
particular, the count for every sample, under every condition,
|
|
is zero.
|
|
|
|
:param cond_samples: The samples to initialize the conditional
|
|
frequency distribution with
|
|
:type cond_samples: Sequence of (condition, sample) tuples
|
|
"""
|
|
defaultdict.__init__(self, FreqDist)
|
|
|
|
if cond_samples:
|
|
for (cond, sample) in cond_samples:
|
|
self[cond][sample] += 1
|
|
|
|
def __reduce__(self):
|
|
kv_pairs = ((cond, self[cond]) for cond in self.conditions())
|
|
return (self.__class__, (), None, None, kv_pairs)
|
|
|
|
def conditions(self):
|
|
"""
|
|
Return a list of the conditions that have been accessed for
|
|
this ``ConditionalFreqDist``. Use the indexing operator to
|
|
access the frequency distribution for a given condition.
|
|
Note that the frequency distributions for some conditions
|
|
may contain zero sample outcomes.
|
|
|
|
:rtype: list
|
|
"""
|
|
return list(self.keys())
|
|
|
|
def N(self):
|
|
"""
|
|
Return the total number of sample outcomes that have been
|
|
recorded by this ``ConditionalFreqDist``.
|
|
|
|
:rtype: int
|
|
"""
|
|
return sum(fdist.N() for fdist in itervalues(self))
|
|
|
|
def plot(self, *args, **kwargs):
|
|
"""
|
|
Plot the given samples from the conditional frequency distribution.
|
|
For a cumulative plot, specify cumulative=True.
|
|
(Requires Matplotlib to be installed.)
|
|
|
|
:param samples: The samples to plot
|
|
:type samples: list
|
|
:param title: The title for the graph
|
|
:type title: str
|
|
:param conditions: The conditions to plot (default is all)
|
|
:type conditions: list
|
|
"""
|
|
try:
|
|
from matplotlib import pylab
|
|
except ImportError:
|
|
raise ValueError(
|
|
'The plot function requires matplotlib to be installed.'
|
|
'See http://matplotlib.org/'
|
|
)
|
|
|
|
cumulative = _get_kwarg(kwargs, 'cumulative', False)
|
|
percents = _get_kwarg(kwargs, 'percents', False)
|
|
conditions = _get_kwarg(kwargs, 'conditions', sorted(self.conditions()))
|
|
title = _get_kwarg(kwargs, 'title', '')
|
|
samples = _get_kwarg(
|
|
kwargs, 'samples', sorted(set(v for c in conditions for v in self[c]))
|
|
) # this computation could be wasted
|
|
if "linewidth" not in kwargs:
|
|
kwargs["linewidth"] = 2
|
|
|
|
for condition in conditions:
|
|
if cumulative:
|
|
freqs = list(self[condition]._cumulative_frequencies(samples))
|
|
ylabel = "Cumulative Counts"
|
|
legend_loc = 'lower right'
|
|
if percents:
|
|
freqs = [f / freqs[len(freqs) - 1] * 100 for f in freqs]
|
|
ylabel = "Cumulative Percents"
|
|
else:
|
|
freqs = [self[condition][sample] for sample in samples]
|
|
ylabel = "Counts"
|
|
legend_loc = 'upper right'
|
|
# percents = [f * 100 for f in freqs] only in ConditionalProbDist?
|
|
kwargs['label'] = "%s" % condition
|
|
pylab.plot(freqs, *args, **kwargs)
|
|
|
|
pylab.legend(loc=legend_loc)
|
|
pylab.grid(True, color="silver")
|
|
pylab.xticks(range(len(samples)), [text_type(s) for s in samples], rotation=90)
|
|
if title:
|
|
pylab.title(title)
|
|
pylab.xlabel("Samples")
|
|
pylab.ylabel(ylabel)
|
|
pylab.show()
|
|
|
|
def tabulate(self, *args, **kwargs):
|
|
"""
|
|
Tabulate the given samples from the conditional frequency distribution.
|
|
|
|
:param samples: The samples to plot
|
|
:type samples: list
|
|
:param conditions: The conditions to plot (default is all)
|
|
:type conditions: list
|
|
:param cumulative: A flag to specify whether the freqs are cumulative (default = False)
|
|
:type title: bool
|
|
"""
|
|
|
|
cumulative = _get_kwarg(kwargs, 'cumulative', False)
|
|
conditions = _get_kwarg(kwargs, 'conditions', sorted(self.conditions()))
|
|
samples = _get_kwarg(
|
|
kwargs, 'samples', sorted(set(v for c in conditions for v in self[c]))
|
|
) # this computation could be wasted
|
|
|
|
width = max(len("%s" % s) for s in samples)
|
|
freqs = dict()
|
|
for c in conditions:
|
|
if cumulative:
|
|
freqs[c] = list(self[c]._cumulative_frequencies(samples))
|
|
else:
|
|
freqs[c] = [self[c][sample] for sample in samples]
|
|
width = max(width, max(len("%d" % f) for f in freqs[c]))
|
|
|
|
condition_size = max(len("%s" % c) for c in conditions)
|
|
print(' ' * condition_size, end=' ')
|
|
for s in samples:
|
|
print("%*s" % (width, s), end=' ')
|
|
print()
|
|
for c in conditions:
|
|
print("%*s" % (condition_size, c), end=' ')
|
|
for f in freqs[c]:
|
|
print("%*d" % (width, f), end=' ')
|
|
print()
|
|
|
|
# Mathematical operators
|
|
|
|
def __add__(self, other):
|
|
"""
|
|
Add counts from two ConditionalFreqDists.
|
|
"""
|
|
if not isinstance(other, ConditionalFreqDist):
|
|
return NotImplemented
|
|
result = ConditionalFreqDist()
|
|
for cond in self.conditions():
|
|
newfreqdist = self[cond] + other[cond]
|
|
if newfreqdist:
|
|
result[cond] = newfreqdist
|
|
for cond in other.conditions():
|
|
if cond not in self.conditions():
|
|
for elem, count in other[cond].items():
|
|
if count > 0:
|
|
result[cond][elem] = count
|
|
return result
|
|
|
|
def __sub__(self, other):
|
|
"""
|
|
Subtract count, but keep only results with positive counts.
|
|
"""
|
|
if not isinstance(other, ConditionalFreqDist):
|
|
return NotImplemented
|
|
result = ConditionalFreqDist()
|
|
for cond in self.conditions():
|
|
newfreqdist = self[cond] - other[cond]
|
|
if newfreqdist:
|
|
result[cond] = newfreqdist
|
|
for cond in other.conditions():
|
|
if cond not in self.conditions():
|
|
for elem, count in other[cond].items():
|
|
if count < 0:
|
|
result[cond][elem] = 0 - count
|
|
return result
|
|
|
|
def __or__(self, other):
|
|
"""
|
|
Union is the maximum of value in either of the input counters.
|
|
"""
|
|
if not isinstance(other, ConditionalFreqDist):
|
|
return NotImplemented
|
|
result = ConditionalFreqDist()
|
|
for cond in self.conditions():
|
|
newfreqdist = self[cond] | other[cond]
|
|
if newfreqdist:
|
|
result[cond] = newfreqdist
|
|
for cond in other.conditions():
|
|
if cond not in self.conditions():
|
|
for elem, count in other[cond].items():
|
|
if count > 0:
|
|
result[cond][elem] = count
|
|
return result
|
|
|
|
def __and__(self, other):
|
|
"""
|
|
Intersection is the minimum of corresponding counts.
|
|
"""
|
|
if not isinstance(other, ConditionalFreqDist):
|
|
return NotImplemented
|
|
result = ConditionalFreqDist()
|
|
for cond in self.conditions():
|
|
newfreqdist = self[cond] & other[cond]
|
|
if newfreqdist:
|
|
result[cond] = newfreqdist
|
|
return result
|
|
|
|
# @total_ordering doesn't work here, since the class inherits from a builtin class
|
|
def __le__(self, other):
|
|
if not isinstance(other, ConditionalFreqDist):
|
|
raise_unorderable_types("<=", self, other)
|
|
return set(self.conditions()).issubset(other.conditions()) and all(
|
|
self[c] <= other[c] for c in self.conditions()
|
|
)
|
|
|
|
def __lt__(self, other):
|
|
if not isinstance(other, ConditionalFreqDist):
|
|
raise_unorderable_types("<", self, other)
|
|
return self <= other and self != other
|
|
|
|
def __ge__(self, other):
|
|
if not isinstance(other, ConditionalFreqDist):
|
|
raise_unorderable_types(">=", self, other)
|
|
return other <= self
|
|
|
|
def __gt__(self, other):
|
|
if not isinstance(other, ConditionalFreqDist):
|
|
raise_unorderable_types(">", self, other)
|
|
return other < self
|
|
|
|
def __repr__(self):
|
|
"""
|
|
Return a string representation of this ``ConditionalFreqDist``.
|
|
|
|
:rtype: str
|
|
"""
|
|
return '<ConditionalFreqDist with %d conditions>' % len(self)
|
|
|
|
|
|
@compat.python_2_unicode_compatible
|
|
@add_metaclass(ABCMeta)
|
|
class ConditionalProbDistI(dict):
|
|
"""
|
|
A collection of probability distributions for a single experiment
|
|
run under different conditions. Conditional probability
|
|
distributions are used to estimate the likelihood of each sample,
|
|
given the condition under which the experiment was run. For
|
|
example, a conditional probability distribution could be used to
|
|
estimate the probability of each word type in a document, given
|
|
the length of the word type. Formally, a conditional probability
|
|
distribution can be defined as a function that maps from each
|
|
condition to the ``ProbDist`` for the experiment under that
|
|
condition.
|
|
"""
|
|
|
|
@abstractmethod
|
|
def __init__(self):
|
|
"""
|
|
Classes inheriting from ConditionalProbDistI should implement __init__.
|
|
"""
|
|
|
|
def conditions(self):
|
|
"""
|
|
Return a list of the conditions that are represented by
|
|
this ``ConditionalProbDist``. Use the indexing operator to
|
|
access the probability distribution for a given condition.
|
|
|
|
:rtype: list
|
|
"""
|
|
return list(self.keys())
|
|
|
|
def __repr__(self):
|
|
"""
|
|
Return a string representation of this ``ConditionalProbDist``.
|
|
|
|
:rtype: str
|
|
"""
|
|
return '<%s with %d conditions>' % (type(self).__name__, len(self))
|
|
|
|
|
|
class ConditionalProbDist(ConditionalProbDistI):
|
|
"""
|
|
A conditional probability distribution modeling the experiments
|
|
that were used to generate a conditional frequency distribution.
|
|
A ConditionalProbDist is constructed from a
|
|
``ConditionalFreqDist`` and a ``ProbDist`` factory:
|
|
|
|
- The ``ConditionalFreqDist`` specifies the frequency
|
|
distribution for each condition.
|
|
- The ``ProbDist`` factory is a function that takes a
|
|
condition's frequency distribution, and returns its
|
|
probability distribution. A ``ProbDist`` class's name (such as
|
|
``MLEProbDist`` or ``HeldoutProbDist``) can be used to specify
|
|
that class's constructor.
|
|
|
|
The first argument to the ``ProbDist`` factory is the frequency
|
|
distribution that it should model; and the remaining arguments are
|
|
specified by the ``factory_args`` parameter to the
|
|
``ConditionalProbDist`` constructor. For example, the following
|
|
code constructs a ``ConditionalProbDist``, where the probability
|
|
distribution for each condition is an ``ELEProbDist`` with 10 bins:
|
|
|
|
>>> from nltk.corpus import brown
|
|
>>> from nltk.probability import ConditionalFreqDist
|
|
>>> from nltk.probability import ConditionalProbDist, ELEProbDist
|
|
>>> cfdist = ConditionalFreqDist(brown.tagged_words()[:5000])
|
|
>>> cpdist = ConditionalProbDist(cfdist, ELEProbDist, 10)
|
|
>>> cpdist['passed'].max()
|
|
'VBD'
|
|
>>> cpdist['passed'].prob('VBD')
|
|
0.423...
|
|
|
|
"""
|
|
|
|
def __init__(self, cfdist, probdist_factory, *factory_args, **factory_kw_args):
|
|
"""
|
|
Construct a new conditional probability distribution, based on
|
|
the given conditional frequency distribution and ``ProbDist``
|
|
factory.
|
|
|
|
:type cfdist: ConditionalFreqDist
|
|
:param cfdist: The ``ConditionalFreqDist`` specifying the
|
|
frequency distribution for each condition.
|
|
:type probdist_factory: class or function
|
|
:param probdist_factory: The function or class that maps
|
|
a condition's frequency distribution to its probability
|
|
distribution. The function is called with the frequency
|
|
distribution as its first argument,
|
|
``factory_args`` as its remaining arguments, and
|
|
``factory_kw_args`` as keyword arguments.
|
|
:type factory_args: (any)
|
|
:param factory_args: Extra arguments for ``probdist_factory``.
|
|
These arguments are usually used to specify extra
|
|
properties for the probability distributions of individual
|
|
conditions, such as the number of bins they contain.
|
|
:type factory_kw_args: (any)
|
|
:param factory_kw_args: Extra keyword arguments for ``probdist_factory``.
|
|
"""
|
|
self._probdist_factory = probdist_factory
|
|
self._factory_args = factory_args
|
|
self._factory_kw_args = factory_kw_args
|
|
|
|
for condition in cfdist:
|
|
self[condition] = probdist_factory(
|
|
cfdist[condition], *factory_args, **factory_kw_args
|
|
)
|
|
|
|
def __missing__(self, key):
|
|
self[key] = self._probdist_factory(
|
|
FreqDist(), *self._factory_args, **self._factory_kw_args
|
|
)
|
|
return self[key]
|
|
|
|
|
|
class DictionaryConditionalProbDist(ConditionalProbDistI):
|
|
"""
|
|
An alternative ConditionalProbDist that simply wraps a dictionary of
|
|
ProbDists rather than creating these from FreqDists.
|
|
"""
|
|
|
|
def __init__(self, probdist_dict):
|
|
"""
|
|
:param probdist_dict: a dictionary containing the probdists indexed
|
|
by the conditions
|
|
:type probdist_dict: dict any -> probdist
|
|
"""
|
|
self.update(probdist_dict)
|
|
|
|
def __missing__(self, key):
|
|
self[key] = DictionaryProbDist()
|
|
return self[key]
|
|
|
|
|
|
##//////////////////////////////////////////////////////
|
|
## Adding in log-space.
|
|
##//////////////////////////////////////////////////////
|
|
|
|
# If the difference is bigger than this, then just take the bigger one:
|
|
_ADD_LOGS_MAX_DIFF = math.log(1e-30, 2)
|
|
|
|
|
|
def add_logs(logx, logy):
|
|
"""
|
|
Given two numbers ``logx`` = *log(x)* and ``logy`` = *log(y)*, return
|
|
*log(x+y)*. Conceptually, this is the same as returning
|
|
``log(2**(logx)+2**(logy))``, but the actual implementation
|
|
avoids overflow errors that could result from direct computation.
|
|
"""
|
|
if logx < logy + _ADD_LOGS_MAX_DIFF:
|
|
return logy
|
|
if logy < logx + _ADD_LOGS_MAX_DIFF:
|
|
return logx
|
|
base = min(logx, logy)
|
|
return base + math.log(2 ** (logx - base) + 2 ** (logy - base), 2)
|
|
|
|
|
|
def sum_logs(logs):
|
|
return reduce(add_logs, logs[1:], logs[0]) if len(logs) != 0 else _NINF
|
|
|
|
|
|
##//////////////////////////////////////////////////////
|
|
## Probabilistic Mix-in
|
|
##//////////////////////////////////////////////////////
|
|
|
|
|
|
class ProbabilisticMixIn(object):
|
|
"""
|
|
A mix-in class to associate probabilities with other classes
|
|
(trees, rules, etc.). To use the ``ProbabilisticMixIn`` class,
|
|
define a new class that derives from an existing class and from
|
|
ProbabilisticMixIn. You will need to define a new constructor for
|
|
the new class, which explicitly calls the constructors of both its
|
|
parent classes. For example:
|
|
|
|
>>> from nltk.probability import ProbabilisticMixIn
|
|
>>> class A:
|
|
... def __init__(self, x, y): self.data = (x,y)
|
|
...
|
|
>>> class ProbabilisticA(A, ProbabilisticMixIn):
|
|
... def __init__(self, x, y, **prob_kwarg):
|
|
... A.__init__(self, x, y)
|
|
... ProbabilisticMixIn.__init__(self, **prob_kwarg)
|
|
|
|
See the documentation for the ProbabilisticMixIn
|
|
``constructor<__init__>`` for information about the arguments it
|
|
expects.
|
|
|
|
You should generally also redefine the string representation
|
|
methods, the comparison methods, and the hashing method.
|
|
"""
|
|
|
|
def __init__(self, **kwargs):
|
|
"""
|
|
Initialize this object's probability. This initializer should
|
|
be called by subclass constructors. ``prob`` should generally be
|
|
the first argument for those constructors.
|
|
|
|
:param prob: The probability associated with the object.
|
|
:type prob: float
|
|
:param logprob: The log of the probability associated with
|
|
the object.
|
|
:type logprob: float
|
|
"""
|
|
if 'prob' in kwargs:
|
|
if 'logprob' in kwargs:
|
|
raise TypeError('Must specify either prob or logprob ' '(not both)')
|
|
else:
|
|
ProbabilisticMixIn.set_prob(self, kwargs['prob'])
|
|
elif 'logprob' in kwargs:
|
|
ProbabilisticMixIn.set_logprob(self, kwargs['logprob'])
|
|
else:
|
|
self.__prob = self.__logprob = None
|
|
|
|
def set_prob(self, prob):
|
|
"""
|
|
Set the probability associated with this object to ``prob``.
|
|
|
|
:param prob: The new probability
|
|
:type prob: float
|
|
"""
|
|
self.__prob = prob
|
|
self.__logprob = None
|
|
|
|
def set_logprob(self, logprob):
|
|
"""
|
|
Set the log probability associated with this object to
|
|
``logprob``. I.e., set the probability associated with this
|
|
object to ``2**(logprob)``.
|
|
|
|
:param logprob: The new log probability
|
|
:type logprob: float
|
|
"""
|
|
self.__logprob = logprob
|
|
self.__prob = None
|
|
|
|
def prob(self):
|
|
"""
|
|
Return the probability associated with this object.
|
|
|
|
:rtype: float
|
|
"""
|
|
if self.__prob is None:
|
|
if self.__logprob is None:
|
|
return None
|
|
self.__prob = 2 ** (self.__logprob)
|
|
return self.__prob
|
|
|
|
def logprob(self):
|
|
"""
|
|
Return ``log(p)``, where ``p`` is the probability associated
|
|
with this object.
|
|
|
|
:rtype: float
|
|
"""
|
|
if self.__logprob is None:
|
|
if self.__prob is None:
|
|
return None
|
|
self.__logprob = math.log(self.__prob, 2)
|
|
return self.__logprob
|
|
|
|
|
|
class ImmutableProbabilisticMixIn(ProbabilisticMixIn):
|
|
def set_prob(self, prob):
|
|
raise ValueError('%s is immutable' % self.__class__.__name__)
|
|
|
|
def set_logprob(self, prob):
|
|
raise ValueError('%s is immutable' % self.__class__.__name__)
|
|
|
|
|
|
## Helper function for processing keyword arguments
|
|
|
|
|
|
def _get_kwarg(kwargs, key, default):
|
|
if key in kwargs:
|
|
arg = kwargs[key]
|
|
del kwargs[key]
|
|
else:
|
|
arg = default
|
|
return arg
|
|
|
|
|
|
##//////////////////////////////////////////////////////
|
|
## Demonstration
|
|
##//////////////////////////////////////////////////////
|
|
|
|
|
|
def _create_rand_fdist(numsamples, numoutcomes):
|
|
"""
|
|
Create a new frequency distribution, with random samples. The
|
|
samples are numbers from 1 to ``numsamples``, and are generated by
|
|
summing two numbers, each of which has a uniform distribution.
|
|
"""
|
|
|
|
fdist = FreqDist()
|
|
for x in range(numoutcomes):
|
|
y = random.randint(1, (1 + numsamples) // 2) + random.randint(
|
|
0, numsamples // 2
|
|
)
|
|
fdist[y] += 1
|
|
return fdist
|
|
|
|
|
|
def _create_sum_pdist(numsamples):
|
|
"""
|
|
Return the true probability distribution for the experiment
|
|
``_create_rand_fdist(numsamples, x)``.
|
|
"""
|
|
fdist = FreqDist()
|
|
for x in range(1, (1 + numsamples) // 2 + 1):
|
|
for y in range(0, numsamples // 2 + 1):
|
|
fdist[x + y] += 1
|
|
return MLEProbDist(fdist)
|
|
|
|
|
|
def demo(numsamples=6, numoutcomes=500):
|
|
"""
|
|
A demonstration of frequency distributions and probability
|
|
distributions. This demonstration creates three frequency
|
|
distributions with, and uses them to sample a random process with
|
|
``numsamples`` samples. Each frequency distribution is sampled
|
|
``numoutcomes`` times. These three frequency distributions are
|
|
then used to build six probability distributions. Finally, the
|
|
probability estimates of these distributions are compared to the
|
|
actual probability of each sample.
|
|
|
|
:type numsamples: int
|
|
:param numsamples: The number of samples to use in each demo
|
|
frequency distributions.
|
|
:type numoutcomes: int
|
|
:param numoutcomes: The total number of outcomes for each
|
|
demo frequency distribution. These outcomes are divided into
|
|
``numsamples`` bins.
|
|
:rtype: None
|
|
"""
|
|
|
|
# Randomly sample a stochastic process three times.
|
|
fdist1 = _create_rand_fdist(numsamples, numoutcomes)
|
|
fdist2 = _create_rand_fdist(numsamples, numoutcomes)
|
|
fdist3 = _create_rand_fdist(numsamples, numoutcomes)
|
|
|
|
# Use our samples to create probability distributions.
|
|
pdists = [
|
|
MLEProbDist(fdist1),
|
|
LidstoneProbDist(fdist1, 0.5, numsamples),
|
|
HeldoutProbDist(fdist1, fdist2, numsamples),
|
|
HeldoutProbDist(fdist2, fdist1, numsamples),
|
|
CrossValidationProbDist([fdist1, fdist2, fdist3], numsamples),
|
|
SimpleGoodTuringProbDist(fdist1),
|
|
SimpleGoodTuringProbDist(fdist1, 7),
|
|
_create_sum_pdist(numsamples),
|
|
]
|
|
|
|
# Find the probability of each sample.
|
|
vals = []
|
|
for n in range(1, numsamples + 1):
|
|
vals.append(tuple([n, fdist1.freq(n)] + [pdist.prob(n) for pdist in pdists]))
|
|
|
|
# Print the results in a formatted table.
|
|
print(
|
|
(
|
|
'%d samples (1-%d); %d outcomes were sampled for each FreqDist'
|
|
% (numsamples, numsamples, numoutcomes)
|
|
)
|
|
)
|
|
print('=' * 9 * (len(pdists) + 2))
|
|
FORMATSTR = ' FreqDist ' + '%8s ' * (len(pdists) - 1) + '| Actual'
|
|
print(FORMATSTR % tuple(repr(pdist)[1:9] for pdist in pdists[:-1]))
|
|
print('-' * 9 * (len(pdists) + 2))
|
|
FORMATSTR = '%3d %8.6f ' + '%8.6f ' * (len(pdists) - 1) + '| %8.6f'
|
|
for val in vals:
|
|
print(FORMATSTR % val)
|
|
|
|
# Print the totals for each column (should all be 1.0)
|
|
zvals = list(zip(*vals))
|
|
sums = [sum(val) for val in zvals[1:]]
|
|
print('-' * 9 * (len(pdists) + 2))
|
|
FORMATSTR = 'Total ' + '%8.6f ' * (len(pdists)) + '| %8.6f'
|
|
print(FORMATSTR % tuple(sums))
|
|
print('=' * 9 * (len(pdists) + 2))
|
|
|
|
# Display the distributions themselves, if they're short enough.
|
|
if len("%s" % fdist1) < 70:
|
|
print(' fdist1: %s' % fdist1)
|
|
print(' fdist2: %s' % fdist2)
|
|
print(' fdist3: %s' % fdist3)
|
|
print()
|
|
|
|
print('Generating:')
|
|
for pdist in pdists:
|
|
fdist = FreqDist(pdist.generate() for i in range(5000))
|
|
print('%20s %s' % (pdist.__class__.__name__[:20], ("%s" % fdist)[:55]))
|
|
print()
|
|
|
|
|
|
def gt_demo():
|
|
from nltk import corpus
|
|
|
|
emma_words = corpus.gutenberg.words('austen-emma.txt')
|
|
fd = FreqDist(emma_words)
|
|
sgt = SimpleGoodTuringProbDist(fd)
|
|
print('%18s %8s %14s' % ("word", "freqency", "SimpleGoodTuring"))
|
|
fd_keys_sorted = (
|
|
key for key, value in sorted(fd.items(), key=lambda item: item[1], reverse=True)
|
|
)
|
|
for key in fd_keys_sorted:
|
|
print('%18s %8d %14e' % (key, fd[key], sgt.prob(key)))
|
|
|
|
|
|
if __name__ == '__main__':
|
|
demo(6, 10)
|
|
demo(5, 5000)
|
|
gt_demo()
|
|
|
|
__all__ = [
|
|
'ConditionalFreqDist',
|
|
'ConditionalProbDist',
|
|
'ConditionalProbDistI',
|
|
'CrossValidationProbDist',
|
|
'DictionaryConditionalProbDist',
|
|
'DictionaryProbDist',
|
|
'ELEProbDist',
|
|
'FreqDist',
|
|
'SimpleGoodTuringProbDist',
|
|
'HeldoutProbDist',
|
|
'ImmutableProbabilisticMixIn',
|
|
'LaplaceProbDist',
|
|
'LidstoneProbDist',
|
|
'MLEProbDist',
|
|
'MutableProbDist',
|
|
'KneserNeyProbDist',
|
|
'ProbDistI',
|
|
'ProbabilisticMixIn',
|
|
'UniformProbDist',
|
|
'WittenBellProbDist',
|
|
'add_logs',
|
|
'log_likelihood',
|
|
'sum_logs',
|
|
'entropy',
|
|
]
|