X-Git-Url: https://git.njae.me.uk/?a=blobdiff_plain;f=language_models.py;h=19f886fcefcb4384184e0bbad108e6925f029bbf;hb=236b087b3891bbedca39de40f0a2cce42fbc62c8;hp=d45738657a356a38c5139838da665044fe9257e6;hpb=49dc272d2fc91e7340e56e9e7b96da6ab63514bb;p=cipher-tools.git diff --git a/language_models.py b/language_models.py index d457386..19f886f 100644 --- a/language_models.py +++ b/language_models.py @@ -6,6 +6,8 @@ import unicodedata import itertools from math import log10 +unaccent_specials = ''.maketrans({"’": "'"}) + def letters(text): """Remove all non-alphabetic characters from a text >>> letters('The Quick') @@ -31,7 +33,8 @@ def unaccent(text): >>> unaccent('HÉLLÖ') 'HELLO' """ - return unicodedata.normalize('NFKD', text).\ + translated_text = text.translate(unaccent_specials) + return unicodedata.normalize('NFKD', translated_text).\ encode('ascii', 'ignore').\ decode('utf-8') @@ -88,6 +91,19 @@ def random_english_letter(): return weighted_choice(normalised_english_counts) +def ngrams(text, n): + """Returns all n-grams of a text + + >>> ngrams(sanitise('the quick brown fox'), 2) # doctest: +NORMALIZE_WHITESPACE + ['th', 'he', 'eq', 'qu', 'ui', 'ic', 'ck', 'kb', 'br', 'ro', 'ow', 'wn', + 'nf', 'fo', 'ox'] + >>> ngrams(sanitise('the quick brown fox'), 4) # doctest: +NORMALIZE_WHITESPACE + ['theq', 'hequ', 'equi', 'quic', 'uick', 'ickb', 'ckbr', 'kbro', 'brow', + 'rown', 'ownf', 'wnfo', 'nfox'] + """ + return [text[i:i+n] for i in range(len(text)-n+1)] + + class Pdist(dict): """A probability distribution estimated from counts in datafile. Values are stored and returned as log probabilities. @@ -108,6 +124,7 @@ def log_probability_of_unknown_word(key, N): Pw = Pdist(datafile('count_1w.txt'), log_probability_of_unknown_word) Pl = Pdist(datafile('count_1l.txt'), lambda _k, _N: 0) +P2l = Pdist(datafile('count_2l.txt'), lambda _k, _N: 0) def Pwords(words): """The Naive Bayes log probability of a sequence of words. @@ -119,6 +136,11 @@ def Pletters(letters): """ return sum(Pl[l.lower()] for l in letters) +def Pbigrams(letters): + """The Naive Bayes log probability of the bigrams formed from a sequence + of letters. + """ + return sum(P2l[p] for p in ngrams(letters, 2)) def cosine_distance_score(text):