# -*- coding: utf-8 -*- # Copyright (c) Microsoft Corporation. # Licensed under the MIT license. # Natural Language Toolkit: BLEU Score # # Copyright (C) 2001-2020 NLTK Project # Authors: Chin Yee Lee, Hengfeng Li, Ruxin Hou, Calvin Tanujaya Lim # Contributors: Björn Mattsson, Dmitrijs Milajevs, Liling Tan # URL: # For license information, see LICENSE.TXT """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_weighted_ngram_match( [references], [hypothesis], weights, smoothing_function, auto_reweigh ) def corpus_weighted_ngram_match( 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 """ # Before proceeding to compute BLEU, perform sanity checks. p_numerators = Counter() # Key = ngram order, and value = no. of ngram matches. p_denominators = Counter() # Key = ngram order, and value = no. of ngram in ref. 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 " ) # Iterate through each hypothesis and their corresponding references. for references, hypothesis in zip(list_of_references, hypotheses): # For each order of ngram, calculate the numerator and # denominator for the corpus-level modified precision. for i, _ in enumerate(weights, start=1): p_i_numeraotr, p_i_denominator = modified_recall(references, hypothesis, i) p_numerators[i] += p_i_numeraotr p_denominators[i] += p_i_denominator # Calculate the hypothesis length and the closest reference length. # Adds them to the corpus-level hypothesis and reference counts. hyp_len = len(hypothesis) hyp_lengths += hyp_len ref_lengths += closest_ref_length(references, hyp_len) # Calculate corpus-level brevity penalty. bp = brevity_penalty(ref_lengths, hyp_lengths) # Uniformly re-weighting based on maximum hypothesis lengths if largest # order of n-grams < 4 and weights is set at default. if auto_reweigh: if hyp_lengths < 4 and weights == (0.25, 0.25, 0.25, 0.25): weights = (1 / hyp_lengths,) * hyp_lengths # Collects the various recall values for the different ngram orders. p_n = [ (p_numerators[i], p_denominators[i]) for i, _ in enumerate(weights, start=1) ] # Returns 0 if there's no matching n-grams # We only need to check for p_numerators[1] == 0, since if there's # no unigrams, there won't be any higher order ngrams. if p_numerators[1] == 0: return 0 # If there's no smoothing, set use method0 from SmoothinFunction class. if not smoothing_function: smoothing_function = SmoothingFunction().method1 # Smoothen the modified precision. # Note: smoothing_function() may convert values into floats; # it tries to retain the Fraction object as much as the # smoothing method allows. p_n = smoothing_function( p_n, references=references, hypothesis=hypothesis, hyp_len=hyp_lengths ) # pdb.set_trace() s = (w_i * math.log(p_i[0]/p_i[1]) for w_i, p_i in zip(weights, p_n)) s = bp * math.exp(math.fsum(s)) return s def modified_recall(references, hypothesis, n): """ Calculate modified ngram recall. :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 """ # Extracts all ngrams in hypothesis # Set an empty Counter if hypothesis is empty. # pdb.set_trace() numerator = 0 denominator = 0 counts = Counter(ngrams(hypothesis, n)) if len(hypothesis) >= n else Counter() # Extract a union of references' counts. # max_counts = reduce(or_, [Counter(ngrams(ref, n)) for ref in references]) max_counts = {} for reference_and_weights in references: reference = reference_and_weights[0] weights = reference_and_weights[1] reference_counts = ( Counter(ngrams(reference, n)) if len(reference) >= n else Counter() ) # for ngram in reference_counts: # max_counts[ngram] = max(max_counts.get(ngram, 0), counts[ngram]) clipped_counts = { ngram: min(count, counts[ngram]) for ngram, count in reference_counts.items() } # reweight if n == 1 and len(weights) == len(reference_counts): def weighted_sum(weights, counts): sum_counts = 0 for ngram, count in counts.items(): sum_counts += count * (weights[ngram[0]] if ngram[0] in weights else 1) return sum_counts numerator += weighted_sum(weights, clipped_counts) denominator += max(1, weighted_sum(weights, reference_counts)) else: numerator += sum(clipped_counts.values()) denominator += max(1, sum(reference_counts.values())) # # Assigns the intersection between hypothesis and references' counts. # clipped_counts = { # ngram: min(count, max_counts[ngram]) for ngram, count in counts.items() # } # numerator += sum(clipped_counts.values()) # # Ensures that denominator is minimum 1 to avoid ZeroDivisionError. # # Usually this happens when the ngram order is > len(reference). # denominator += max(1, sum(counts.values())) #return Fraction(numerator, denominator, _normalize=False) return numerator, denominator 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 # If hypothesis is empty, brevity penalty = 0 should result in BLEU = 0.0 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[0] != 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) # When numerator==0 where denonminator==0 or !=0, the result # for the precision score should be equal to 0 or undefined. # Due to BLEU geometric mean computation in logarithm space, # we we need to take the return sys.float_info.min such that # math.log(sys.float_info.min) returns a 0 precision score. 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[0] + self.epsilon), p_i[1]) if p_i[0] == 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 [ (p_i[0] + 1, p_i[1] + 1) 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 # From the mteval-v13a.pl, it's referred to as k. 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 ) # Note that this K is different from the K from NIST. 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 = {} # Requires an precision value for an addition ngram order. 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) # This smoothing only works when p_1 and p_2 is non-zero. # Raise an error with an appropriate message when the input is too short # to use this smoothing technique. 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]: # Skips the first 2 orders of ngrams. continue else: pi0 = 0 if p_n[i - 2] == 0 else p_n[i - 1] ** 2 / p_n[i - 2] # No. of ngrams in translation that matches the reference. m = p_i.numerator # No. of ngrams in translation. l = sum(1 for _ in ngrams(hypothesis, i + 1)) # Calculates the interpolated precision. 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