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| """BLEU score implementation."""
|
|
|
| import math
|
| import sys
|
| from fractions import Fraction
|
| import warnings
|
| from collections import Counter
|
|
|
| from .utils import ngrams
|
| import pdb
|
|
|
|
|
| def sentence_bleu(
|
| references,
|
| hypothesis,
|
| weights=(0.25, 0.25, 0.25, 0.25),
|
| smoothing_function=None,
|
| auto_reweigh=False,
|
| ):
|
| """
|
| Calculate BLEU score (Bilingual Evaluation Understudy) from
|
| Papineni, Kishore, Salim Roukos, Todd Ward, and Wei-Jing Zhu. 2002.
|
| "BLEU: a method for automatic evaluation of machine translation."
|
| In Proceedings of ACL. http://www.aclweb.org/anthology/P02-1040.pdf
|
| >>> hypothesis1 = ['It', 'is', 'a', 'guide', 'to', 'action', 'which',
|
| ... 'ensures', 'that', 'the', 'military', 'always',
|
| ... 'obeys', 'the', 'commands', 'of', 'the', 'party']
|
| >>> hypothesis2 = ['It', 'is', 'to', 'insure', 'the', 'troops',
|
| ... 'forever', 'hearing', 'the', 'activity', 'guidebook',
|
| ... 'that', 'party', 'direct']
|
| >>> reference1 = ['It', 'is', 'a', 'guide', 'to', 'action', 'that',
|
| ... 'ensures', 'that', 'the', 'military', 'will', 'forever',
|
| ... 'heed', 'Party', 'commands']
|
| >>> reference2 = ['It', 'is', 'the', 'guiding', 'principle', 'which',
|
| ... 'guarantees', 'the', 'military', 'forces', 'always',
|
| ... 'being', 'under', 'the', 'command', 'of', 'the',
|
| ... 'Party']
|
| >>> reference3 = ['It', 'is', 'the', 'practical', 'guide', 'for', 'the',
|
| ... 'army', 'always', 'to', 'heed', 'the', 'directions',
|
| ... 'of', 'the', 'party']
|
| >>> sentence_bleu([reference1, reference2, reference3], hypothesis1) # doctest: +ELLIPSIS
|
| 0.5045...
|
| If there is no ngrams overlap for any order of n-grams, BLEU returns the
|
| value 0. This is because the precision for the order of n-grams without
|
| overlap is 0, and the geometric mean in the final BLEU score computation
|
| multiplies the 0 with the precision of other n-grams. This results in 0
|
| (independently of the precision of the othe n-gram orders). The following
|
| example has zero 3-gram and 4-gram overlaps:
|
| >>> round(sentence_bleu([reference1, reference2, reference3], hypothesis2),4) # doctest: +ELLIPSIS
|
| 0.0
|
| To avoid this harsh behaviour when no ngram overlaps are found a smoothing
|
| function can be used.
|
| >>> chencherry = SmoothingFunction()
|
| >>> sentence_bleu([reference1, reference2, reference3], hypothesis2,
|
| ... smoothing_function=chencherry.method1) # doctest: +ELLIPSIS
|
| 0.0370...
|
| The default BLEU calculates a score for up to 4-grams using uniform
|
| weights (this is called BLEU-4). To evaluate your translations with
|
| higher/lower order ngrams, use customized weights. E.g. when accounting
|
| for up to 5-grams with uniform weights (this is called BLEU-5) use:
|
| >>> weights = (1./5., 1./5., 1./5., 1./5., 1./5.)
|
| >>> sentence_bleu([reference1, reference2, reference3], hypothesis1, weights) # doctest: +ELLIPSIS
|
| 0.3920...
|
| :param references: reference sentences
|
| :type references: list(list(str))
|
| :param hypothesis: a hypothesis sentence
|
| :type hypothesis: list(str)
|
| :param weights: weights for unigrams, bigrams, trigrams and so on
|
| :type weights: list(float)
|
| :param smoothing_function:
|
| :type smoothing_function: SmoothingFunction
|
| :param auto_reweigh: Option to re-normalize the weights uniformly.
|
| :type auto_reweigh: bool
|
| :return: The sentence-level BLEU score.
|
| :rtype: float
|
| """
|
| return corpus_bleu(
|
| [references], [hypothesis], weights, smoothing_function, auto_reweigh
|
| )
|
|
|
|
|
| def corpus_bleu(
|
| list_of_references,
|
| hypotheses,
|
| weights=(0.25, 0.25, 0.25, 0.25),
|
| smoothing_function=None,
|
| auto_reweigh=False,
|
| ):
|
| """
|
| Calculate a single corpus-level BLEU score (aka. system-level BLEU) for all
|
| the hypotheses and their respective references.
|
| Instead of averaging the sentence level BLEU scores (i.e. marco-average
|
| precision), the original BLEU metric (Papineni et al. 2002) accounts for
|
| the micro-average precision (i.e. summing the numerators and denominators
|
| for each hypothesis-reference(s) pairs before the division).
|
| >>> hyp1 = ['It', 'is', 'a', 'guide', 'to', 'action', 'which',
|
| ... 'ensures', 'that', 'the', 'military', 'always',
|
| ... 'obeys', 'the', 'commands', 'of', 'the', 'party']
|
| >>> ref1a = ['It', 'is', 'a', 'guide', 'to', 'action', 'that',
|
| ... 'ensures', 'that', 'the', 'military', 'will', 'forever',
|
| ... 'heed', 'Party', 'commands']
|
| >>> ref1b = ['It', 'is', 'the', 'guiding', 'principle', 'which',
|
| ... 'guarantees', 'the', 'military', 'forces', 'always',
|
| ... 'being', 'under', 'the', 'command', 'of', 'the', 'Party']
|
| >>> ref1c = ['It', 'is', 'the', 'practical', 'guide', 'for', 'the',
|
| ... 'army', 'always', 'to', 'heed', 'the', 'directions',
|
| ... 'of', 'the', 'party']
|
| >>> hyp2 = ['he', 'read', 'the', 'book', 'because', 'he', 'was',
|
| ... 'interested', 'in', 'world', 'history']
|
| >>> ref2a = ['he', 'was', 'interested', 'in', 'world', 'history',
|
| ... 'because', 'he', 'read', 'the', 'book']
|
| >>> list_of_references = [[ref1a, ref1b, ref1c], [ref2a]]
|
| >>> hypotheses = [hyp1, hyp2]
|
| >>> corpus_bleu(list_of_references, hypotheses) # doctest: +ELLIPSIS
|
| 0.5920...
|
| The example below show that corpus_bleu() is different from averaging
|
| sentence_bleu() for hypotheses
|
| >>> score1 = sentence_bleu([ref1a, ref1b, ref1c], hyp1)
|
| >>> score2 = sentence_bleu([ref2a], hyp2)
|
| >>> (score1 + score2) / 2 # doctest: +ELLIPSIS
|
| 0.6223...
|
| :param list_of_references: a corpus of lists of reference sentences, w.r.t. hypotheses
|
| :type list_of_references: list(list(list(str)))
|
| :param hypotheses: a list of hypothesis sentences
|
| :type hypotheses: list(list(str))
|
| :param weights: weights for unigrams, bigrams, trigrams and so on
|
| :type weights: list(float)
|
| :param smoothing_function:
|
| :type smoothing_function: SmoothingFunction
|
| :param auto_reweigh: Option to re-normalize the weights uniformly.
|
| :type auto_reweigh: bool
|
| :return: The corpus-level BLEU score.
|
| :rtype: float
|
| """
|
|
|
|
|
| p_numerators = Counter()
|
| p_denominators = Counter()
|
| hyp_lengths, ref_lengths = 0, 0
|
|
|
| assert len(list_of_references) == len(hypotheses), (
|
| "The number of hypotheses and their reference(s) should be the " "same "
|
| )
|
|
|
|
|
| for references, hypothesis in zip(list_of_references, hypotheses):
|
|
|
|
|
| for i, _ in enumerate(weights, start=1):
|
| p_i = modified_precision(references, hypothesis, i)
|
| p_numerators[i] += p_i.numerator
|
| p_denominators[i] += p_i.denominator
|
|
|
|
|
|
|
| hyp_len = len(hypothesis)
|
| hyp_lengths += hyp_len
|
| ref_lengths += closest_ref_length(references, hyp_len)
|
|
|
|
|
| bp = brevity_penalty(ref_lengths, hyp_lengths)
|
|
|
|
|
|
|
| if auto_reweigh:
|
| if hyp_lengths < 4 and weights == (0.25, 0.25, 0.25, 0.25):
|
| weights = (1 / hyp_lengths,) * hyp_lengths
|
|
|
|
|
| p_n = [
|
| Fraction(p_numerators[i], p_denominators[i], _normalize=False)
|
| for i, _ in enumerate(weights, start=1)
|
| ]
|
|
|
|
|
|
|
|
|
| if p_numerators[1] == 0:
|
| return 0
|
|
|
|
|
| if not smoothing_function:
|
| smoothing_function = SmoothingFunction().method1
|
|
|
|
|
|
|
|
|
| p_n = smoothing_function(
|
| p_n, references=references, hypothesis=hypothesis, hyp_len=hyp_lengths
|
| )
|
| s = (w_i * math.log(p_i) for w_i, p_i in zip(weights, p_n))
|
| s = bp * math.exp(math.fsum(s))
|
| return s
|
|
|
|
|
| def modified_precision(references, hypothesis, n):
|
| """
|
| Calculate modified ngram precision.
|
| The normal precision method may lead to some wrong translations with
|
| high-precision, e.g., the translation, in which a word of reference
|
| repeats several times, has very high precision.
|
| This function only returns the Fraction object that contains the numerator
|
| and denominator necessary to calculate the corpus-level precision.
|
| To calculate the modified precision for a single pair of hypothesis and
|
| references, cast the Fraction object into a float.
|
| The famous "the the the ... " example shows that you can get BLEU precision
|
| by duplicating high frequency words.
|
| >>> reference1 = 'the cat is on the mat'.split()
|
| >>> reference2 = 'there is a cat on the mat'.split()
|
| >>> hypothesis1 = 'the the the the the the the'.split()
|
| >>> references = [reference1, reference2]
|
| >>> float(modified_precision(references, hypothesis1, n=1)) # doctest: +ELLIPSIS
|
| 0.2857...
|
| In the modified n-gram precision, a reference word will be considered
|
| exhausted after a matching hypothesis word is identified, e.g.
|
| >>> reference1 = ['It', 'is', 'a', 'guide', 'to', 'action', 'that',
|
| ... 'ensures', 'that', 'the', 'military', 'will',
|
| ... 'forever', 'heed', 'Party', 'commands']
|
| >>> reference2 = ['It', 'is', 'the', 'guiding', 'principle', 'which',
|
| ... 'guarantees', 'the', 'military', 'forces', 'always',
|
| ... 'being', 'under', 'the', 'command', 'of', 'the',
|
| ... 'Party']
|
| >>> reference3 = ['It', 'is', 'the', 'practical', 'guide', 'for', 'the',
|
| ... 'army', 'always', 'to', 'heed', 'the', 'directions',
|
| ... 'of', 'the', 'party']
|
| >>> hypothesis = 'of the'.split()
|
| >>> references = [reference1, reference2, reference3]
|
| >>> float(modified_precision(references, hypothesis, n=1))
|
| 1.0
|
| >>> float(modified_precision(references, hypothesis, n=2))
|
| 1.0
|
| An example of a normal machine translation hypothesis:
|
| >>> hypothesis1 = ['It', 'is', 'a', 'guide', 'to', 'action', 'which',
|
| ... 'ensures', 'that', 'the', 'military', 'always',
|
| ... 'obeys', 'the', 'commands', 'of', 'the', 'party']
|
| >>> hypothesis2 = ['It', 'is', 'to', 'insure', 'the', 'troops',
|
| ... 'forever', 'hearing', 'the', 'activity', 'guidebook',
|
| ... 'that', 'party', 'direct']
|
| >>> reference1 = ['It', 'is', 'a', 'guide', 'to', 'action', 'that',
|
| ... 'ensures', 'that', 'the', 'military', 'will',
|
| ... 'forever', 'heed', 'Party', 'commands']
|
| >>> reference2 = ['It', 'is', 'the', 'guiding', 'principle', 'which',
|
| ... 'guarantees', 'the', 'military', 'forces', 'always',
|
| ... 'being', 'under', 'the', 'command', 'of', 'the',
|
| ... 'Party']
|
| >>> reference3 = ['It', 'is', 'the', 'practical', 'guide', 'for', 'the',
|
| ... 'army', 'always', 'to', 'heed', 'the', 'directions',
|
| ... 'of', 'the', 'party']
|
| >>> references = [reference1, reference2, reference3]
|
| >>> float(modified_precision(references, hypothesis1, n=1)) # doctest: +ELLIPSIS
|
| 0.9444...
|
| >>> float(modified_precision(references, hypothesis2, n=1)) # doctest: +ELLIPSIS
|
| 0.5714...
|
| >>> float(modified_precision(references, hypothesis1, n=2)) # doctest: +ELLIPSIS
|
| 0.5882352941176471
|
| >>> float(modified_precision(references, hypothesis2, n=2)) # doctest: +ELLIPSIS
|
| 0.07692...
|
| :param references: A list of reference translations.
|
| :type references: list(list(str))
|
| :param hypothesis: A hypothesis translation.
|
| :type hypothesis: list(str)
|
| :param n: The ngram order.
|
| :type n: int
|
| :return: BLEU's modified precision for the nth order ngram.
|
| :rtype: Fraction
|
| """
|
|
|
|
|
|
|
| counts = Counter(ngrams(hypothesis, n)) if len(hypothesis) >= n else Counter()
|
|
|
|
|
| max_counts = {}
|
| for reference in references:
|
| reference_counts = (
|
| Counter(ngrams(reference, n)) if len(reference) >= n else Counter()
|
| )
|
| for ngram in counts:
|
| max_counts[ngram] = max(max_counts.get(ngram, 0), reference_counts[ngram])
|
|
|
|
|
| clipped_counts = {
|
| ngram: min(count, max_counts[ngram]) for ngram, count in counts.items()
|
| }
|
|
|
| numerator = sum(clipped_counts.values())
|
|
|
|
|
| denominator = max(1, sum(counts.values()))
|
|
|
| return Fraction(numerator, denominator, _normalize=False)
|
|
|
|
|
| def closest_ref_length(references, hyp_len):
|
| """
|
| This function finds the reference that is the closest length to the
|
| hypothesis. The closest reference length is referred to as *r* variable
|
| from the brevity penalty formula in Papineni et. al. (2002)
|
| :param references: A list of reference translations.
|
| :type references: list(list(str))
|
| :param hyp_len: The length of the hypothesis.
|
| :type hyp_len: int
|
| :return: The length of the reference that's closest to the hypothesis.
|
| :rtype: int
|
| """
|
| ref_lens = (len(reference) for reference in references)
|
| closest_ref_len = min(
|
| ref_lens, key=lambda ref_len: (abs(ref_len - hyp_len), ref_len)
|
| )
|
| return closest_ref_len
|
|
|
|
|
| def brevity_penalty(closest_ref_len, hyp_len):
|
| """
|
| Calculate brevity penalty.
|
| As the modified n-gram precision still has the problem from the short
|
| length sentence, brevity penalty is used to modify the overall BLEU
|
| score according to length.
|
| An example from the paper. There are three references with length 12, 15
|
| and 17. And a concise hypothesis of the length 12. The brevity penalty is 1.
|
| >>> reference1 = list('aaaaaaaaaaaa') # i.e. ['a'] * 12
|
| >>> reference2 = list('aaaaaaaaaaaaaaa') # i.e. ['a'] * 15
|
| >>> reference3 = list('aaaaaaaaaaaaaaaaa') # i.e. ['a'] * 17
|
| >>> hypothesis = list('aaaaaaaaaaaa') # i.e. ['a'] * 12
|
| >>> references = [reference1, reference2, reference3]
|
| >>> hyp_len = len(hypothesis)
|
| >>> closest_ref_len = closest_ref_length(references, hyp_len)
|
| >>> brevity_penalty(closest_ref_len, hyp_len)
|
| 1.0
|
| In case a hypothesis translation is shorter than the references, penalty is
|
| applied.
|
| >>> references = [['a'] * 28, ['a'] * 28]
|
| >>> hypothesis = ['a'] * 12
|
| >>> hyp_len = len(hypothesis)
|
| >>> closest_ref_len = closest_ref_length(references, hyp_len)
|
| >>> brevity_penalty(closest_ref_len, hyp_len)
|
| 0.2635971381157267
|
| The length of the closest reference is used to compute the penalty. If the
|
| length of a hypothesis is 12, and the reference lengths are 13 and 2, the
|
| penalty is applied because the hypothesis length (12) is less then the
|
| closest reference length (13).
|
| >>> references = [['a'] * 13, ['a'] * 2]
|
| >>> hypothesis = ['a'] * 12
|
| >>> hyp_len = len(hypothesis)
|
| >>> closest_ref_len = closest_ref_length(references, hyp_len)
|
| >>> brevity_penalty(closest_ref_len, hyp_len) # doctest: +ELLIPSIS
|
| 0.9200...
|
| The brevity penalty doesn't depend on reference order. More importantly,
|
| when two reference sentences are at the same distance, the shortest
|
| reference sentence length is used.
|
| >>> references = [['a'] * 13, ['a'] * 11]
|
| >>> hypothesis = ['a'] * 12
|
| >>> hyp_len = len(hypothesis)
|
| >>> closest_ref_len = closest_ref_length(references, hyp_len)
|
| >>> bp1 = brevity_penalty(closest_ref_len, hyp_len)
|
| >>> hyp_len = len(hypothesis)
|
| >>> closest_ref_len = closest_ref_length(reversed(references), hyp_len)
|
| >>> bp2 = brevity_penalty(closest_ref_len, hyp_len)
|
| >>> bp1 == bp2 == 1
|
| True
|
| A test example from mteval-v13a.pl (starting from the line 705):
|
| >>> references = [['a'] * 11, ['a'] * 8]
|
| >>> hypothesis = ['a'] * 7
|
| >>> hyp_len = len(hypothesis)
|
| >>> closest_ref_len = closest_ref_length(references, hyp_len)
|
| >>> brevity_penalty(closest_ref_len, hyp_len) # doctest: +ELLIPSIS
|
| 0.8668...
|
| >>> references = [['a'] * 11, ['a'] * 8, ['a'] * 6, ['a'] * 7]
|
| >>> hypothesis = ['a'] * 7
|
| >>> hyp_len = len(hypothesis)
|
| >>> closest_ref_len = closest_ref_length(references, hyp_len)
|
| >>> brevity_penalty(closest_ref_len, hyp_len)
|
| 1.0
|
| :param hyp_len: The length of the hypothesis for a single sentence OR the
|
| sum of all the hypotheses' lengths for a corpus
|
| :type hyp_len: int
|
| :param closest_ref_len: The length of the closest reference for a single
|
| hypothesis OR the sum of all the closest references for every hypotheses.
|
| :type closest_ref_len: int
|
| :return: BLEU's brevity penalty.
|
| :rtype: float
|
| """
|
| if hyp_len > closest_ref_len:
|
| return 1
|
|
|
| elif hyp_len == 0:
|
| return 0
|
| else:
|
| return math.exp(1 - closest_ref_len / hyp_len)
|
|
|
|
|
| class SmoothingFunction:
|
| """
|
| This is an implementation of the smoothing techniques
|
| for segment-level BLEU scores that was presented in
|
| Boxing Chen and Collin Cherry (2014) A Systematic Comparison of
|
| Smoothing Techniques for Sentence-Level BLEU. In WMT14.
|
| http://acl2014.org/acl2014/W14-33/pdf/W14-3346.pdf
|
| """
|
|
|
| def __init__(self, epsilon=0.1, alpha=5, k=5):
|
| """
|
| This will initialize the parameters required for the various smoothing
|
| techniques, the default values are set to the numbers used in the
|
| experiments from Chen and Cherry (2014).
|
| >>> hypothesis1 = ['It', 'is', 'a', 'guide', 'to', 'action', 'which', 'ensures',
|
| ... 'that', 'the', 'military', 'always', 'obeys', 'the',
|
| ... 'commands', 'of', 'the', 'party']
|
| >>> reference1 = ['It', 'is', 'a', 'guide', 'to', 'action', 'that', 'ensures',
|
| ... 'that', 'the', 'military', 'will', 'forever', 'heed',
|
| ... 'Party', 'commands']
|
| >>> chencherry = SmoothingFunction()
|
| >>> print(sentence_bleu([reference1], hypothesis1)) # doctest: +ELLIPSIS
|
| 0.4118...
|
| >>> print(sentence_bleu([reference1], hypothesis1, smoothing_function=chencherry.method0)) # doctest: +ELLIPSIS
|
| 0.4118...
|
| >>> print(sentence_bleu([reference1], hypothesis1, smoothing_function=chencherry.method1)) # doctest: +ELLIPSIS
|
| 0.4118...
|
| >>> print(sentence_bleu([reference1], hypothesis1, smoothing_function=chencherry.method2)) # doctest: +ELLIPSIS
|
| 0.4489...
|
| >>> print(sentence_bleu([reference1], hypothesis1, smoothing_function=chencherry.method3)) # doctest: +ELLIPSIS
|
| 0.4118...
|
| >>> print(sentence_bleu([reference1], hypothesis1, smoothing_function=chencherry.method4)) # doctest: +ELLIPSIS
|
| 0.4118...
|
| >>> print(sentence_bleu([reference1], hypothesis1, smoothing_function=chencherry.method5)) # doctest: +ELLIPSIS
|
| 0.4905...
|
| >>> print(sentence_bleu([reference1], hypothesis1, smoothing_function=chencherry.method6)) # doctest: +ELLIPSIS
|
| 0.4135...
|
| >>> print(sentence_bleu([reference1], hypothesis1, smoothing_function=chencherry.method7)) # doctest: +ELLIPSIS
|
| 0.4905...
|
| :param epsilon: the epsilon value use in method 1
|
| :type epsilon: float
|
| :param alpha: the alpha value use in method 6
|
| :type alpha: int
|
| :param k: the k value use in method 4
|
| :type k: int
|
| """
|
| self.epsilon = epsilon
|
| self.alpha = alpha
|
| self.k = k
|
|
|
| def method0(self, p_n, *args, **kwargs):
|
| """
|
| No smoothing.
|
| """
|
| p_n_new = []
|
| for i, p_i in enumerate(p_n):
|
| if p_i.numerator != 0:
|
| p_n_new.append(p_i)
|
| else:
|
| _msg = str(
|
| "\nThe hypothesis contains 0 counts of {}-gram overlaps.\n"
|
| "Therefore the BLEU score evaluates to 0, independently of\n"
|
| "how many N-gram overlaps of lower order it contains.\n"
|
| "Consider using lower n-gram order or use "
|
| "SmoothingFunction()"
|
| ).format(i + 1)
|
| warnings.warn(_msg)
|
|
|
|
|
|
|
|
|
|
|
| p_n_new.append(sys.float_info.min)
|
| return p_n_new
|
|
|
| def method1(self, p_n, *args, **kwargs):
|
| """
|
| Smoothing method 1: Add *epsilon* counts to precision with 0 counts.
|
| """
|
| return [
|
| (p_i.numerator + self.epsilon) / p_i.denominator
|
| if p_i.numerator == 0
|
| else p_i
|
| for p_i in p_n
|
| ]
|
|
|
| def method2(self, p_n, *args, **kwargs):
|
| """
|
| Smoothing method 2: Add 1 to both numerator and denominator from
|
| Chin-Yew Lin and Franz Josef Och (2004) Automatic evaluation of
|
| machine translation quality using longest common subsequence and
|
| skip-bigram statistics. In ACL04.
|
| """
|
| return [
|
| Fraction(p_i.numerator + 1, p_i.denominator + 1, _normalize=False)
|
| for p_i in p_n
|
| ]
|
|
|
| def method3(self, p_n, *args, **kwargs):
|
| """
|
| Smoothing method 3: NIST geometric sequence smoothing
|
| The smoothing is computed by taking 1 / ( 2^k ), instead of 0, for each
|
| precision score whose matching n-gram count is null.
|
| k is 1 for the first 'n' value for which the n-gram match count is null/
|
| For example, if the text contains:
|
| - one 2-gram match
|
| - and (consequently) two 1-gram matches
|
| the n-gram count for each individual precision score would be:
|
| - n=1 => prec_count = 2 (two unigrams)
|
| - n=2 => prec_count = 1 (one bigram)
|
| - n=3 => prec_count = 1/2 (no trigram, taking 'smoothed' value of 1 / ( 2^k ), with k=1)
|
| - n=4 => prec_count = 1/4 (no fourgram, taking 'smoothed' value of 1 / ( 2^k ), with k=2)
|
| """
|
| incvnt = 1
|
| for i, p_i in enumerate(p_n):
|
| if p_i.numerator == 0:
|
| p_n[i] = 1 / (2 ** incvnt * p_i.denominator)
|
| incvnt += 1
|
| return p_n
|
|
|
| def method4(self, p_n, references, hypothesis, hyp_len=None, *args, **kwargs):
|
| """
|
| Smoothing method 4:
|
| Shorter translations may have inflated precision values due to having
|
| smaller denominators; therefore, we give them proportionally
|
| smaller smoothed counts. Instead of scaling to 1/(2^k), Chen and Cherry
|
| suggests dividing by 1/ln(len(T)), where T is the length of the translation.
|
| """
|
| hyp_len = hyp_len if hyp_len else len(hypothesis)
|
| for i, p_i in enumerate(p_n):
|
| if p_i.numerator == 0 and hyp_len != 0:
|
| incvnt = i + 1 * self.k / math.log(
|
| hyp_len
|
| )
|
| p_n[i] = incvnt / p_i.denominator
|
| return p_n
|
|
|
| def method5(self, p_n, references, hypothesis, hyp_len=None, *args, **kwargs):
|
| """
|
| Smoothing method 5:
|
| The matched counts for similar values of n should be similar. To a
|
| calculate the n-gram matched count, it averages the n−1, n and n+1 gram
|
| matched counts.
|
| """
|
| hyp_len = hyp_len if hyp_len else len(hypothesis)
|
| m = {}
|
|
|
| p_n_plus1 = p_n + [modified_precision(references, hypothesis, 5)]
|
| m[-1] = p_n[0] + 1
|
| for i, p_i in enumerate(p_n):
|
| p_n[i] = (m[i - 1] + p_i + p_n_plus1[i + 1]) / 3
|
| m[i] = p_n[i]
|
| return p_n
|
|
|
| def method6(self, p_n, references, hypothesis, hyp_len=None, *args, **kwargs):
|
| """
|
| Smoothing method 6:
|
| Interpolates the maximum likelihood estimate of the precision *p_n* with
|
| a prior estimate *pi0*. The prior is estimated by assuming that the ratio
|
| between pn and pn−1 will be the same as that between pn−1 and pn−2; from
|
| Gao and He (2013) Training MRF-Based Phrase Translation Models using
|
| Gradient Ascent. In NAACL.
|
| """
|
| hyp_len = hyp_len if hyp_len else len(hypothesis)
|
|
|
|
|
|
|
| assert p_n[2], "This smoothing method requires non-zero precision for bigrams."
|
| for i, p_i in enumerate(p_n):
|
| if i in [0, 1]:
|
| continue
|
| else:
|
| pi0 = 0 if p_n[i - 2] == 0 else p_n[i - 1] ** 2 / p_n[i - 2]
|
|
|
| m = p_i.numerator
|
|
|
| l = sum(1 for _ in ngrams(hypothesis, i + 1))
|
|
|
| p_n[i] = (m + self.alpha * pi0) / (l + self.alpha)
|
| return p_n
|
|
|
| def method7(self, p_n, references, hypothesis, hyp_len=None, *args, **kwargs):
|
| """
|
| Smoothing method 7:
|
| Interpolates methods 4 and 5.
|
| """
|
| hyp_len = hyp_len if hyp_len else len(hypothesis)
|
| p_n = self.method4(p_n, references, hypothesis, hyp_len)
|
| p_n = self.method5(p_n, references, hypothesis, hyp_len)
|
| return p_n
|
|
|
