48

I'm programming a spellcheck program in Python. I have a list of valid words (the dictionary) and I need to output a list of words from this dictionary that have an edit distance of 2 from a given invalid word.

I know I need to start by generating a list with an edit distance of one from the invalid word(and then run that again on all the generated words). I have three methods, inserts(...), deletions(...) and changes(...) that should output a list of words with an edit distance of 1, where inserts outputs all valid words with one more letter than the given word, deletions outputs all valid words with one less letter, and changes outputs all valid words with one different letter.

I've checked a bunch of places but I can't seem to find an algorithm that describes this process. All the ideas I've come up with involve looping through the dictionary list multiple times, which would be extremely time consuming. If anyone could offer some insight, I'd be extremely grateful.

3
63

The thing you are looking at is called an edit distance and here is a nice explanation on wiki. There are a lot of ways how to define a distance between the two words and the one that you want is called Levenshtein distance and here is a DP (dynamic programming) implementation in python.

def levenshteinDistance(s1, s2):
    if len(s1) > len(s2):
        s1, s2 = s2, s1

    distances = range(len(s1) + 1)
    for i2, c2 in enumerate(s2):
        distances_ = [i2+1]
        for i1, c1 in enumerate(s1):
            if c1 == c2:
                distances_.append(distances[i1])
            else:
                distances_.append(1 + min((distances[i1], distances[i1 + 1], distances_[-1])))
        distances = distances_
    return distances[-1]

And a couple of more implementations are here.

4
  • 6
    DP standing for dynamic programming. – Nikana Reklawyks Oct 19 '17 at 6:20
  • @Salvador Dali Shouldn't adjacent transposition return a distance of 1? The above function gives levenshteinDistance("abc","bac") --> 2 – alancalvitti Jan 22 '19 at 21:53
  • 1
    @alancalvitti The only operations are insert, delete and substitute. So in you example you need to delete the a and then reinsert it between the b and c. Two operations. – Anush Apr 17 '19 at 13:06
  • Hello :), do you have by chance a version of it (or of another algorithm) where you can specify an upper bound at the levenshtein distance? (You may check also my post for more details: stackoverflow.com/questions/59686989/…) – Outcast Feb 6 '20 at 16:37
13

difflib in the standard library has various utilities for sequence matching, including the get_close_matches method that you could use. It uses an algorithm adapted from Ratcliff and Obershelp.

From the docs

from difflib import get_close_matches

# Yields ['apple', 'ape']
get_close_matches('appel', ['ape', 'apple', 'peach', 'puppy'])
8

Here is my version for Levenshtein distance

def edit_distance(s1, s2):
    m=len(s1)+1
    n=len(s2)+1

    tbl = {}
    for i in range(m): tbl[i,0]=i
    for j in range(n): tbl[0,j]=j
    for i in range(1, m):
        for j in range(1, n):
            cost = 0 if s1[i-1] == s2[j-1] else 1
            tbl[i,j] = min(tbl[i, j-1]+1, tbl[i-1, j]+1, tbl[i-1, j-1]+cost)

    return tbl[i,j]

print(edit_distance("Helloworld", "HalloWorld"))
1
  • Your code is incorrect. Logic is unsound and return tbl[i,j] should be return tbl[n,m]. – Artur Krajewski Dec 14 '18 at 21:19
8
#this calculates edit distance not levenstein edit distance
word1="rice"

word2="ice"

len_1=len(word1)

len_2=len(word2)

x =[[0]*(len_2+1) for _ in range(len_1+1)]#the matrix whose last element ->edit distance

for i in range(0,len_1+1): #initialization of base case values

    x[i][0]=i
for j in range(0,len_2+1):

    x[0][j]=j
for i in range (1,len_1+1):

    for j in range(1,len_2+1):

        if word1[i-1]==word2[j-1]:
            x[i][j] = x[i-1][j-1] 

        else :
            x[i][j]= min(x[i][j-1],x[i-1][j],x[i-1][j-1])+1

print x[i][j]
3

The specific algorithm you describe is called Levenshtein distance. A quick Google throws up several Python libraries and recipes to calculate it.

1

Similar to Santoshi's solution above but I made three changes:

  1. One line initialization instead of five
  2. No need to define cost alone (just use int(boolean) 0 or 1)
  3. Instead of double for loop use product, (this last one is only cosmetic, double loop seems unavoidable)
from itertools import product

def edit_distance(s1,s2):      
   d={ **{(i,0):i for i in range(len(s1)+1)},**{(0,j):j for i in range(len(s2)+1)}}
   for i, j in product(range(1,len(s1)+1), range(1,len(s2)+1)): 
       d[i,j]=min(int(s[i-1]!=s[j-1]) + d[i-1,j-1], d[i-1,j]+1, d[i,j-1]+1)
   return d[i,j]
1

Using the SequenceMatcher from Python built-in difflib is another way of doing it, but (as correctly pointed out in the comments), the result does not match the definition of an edit distance exactly. Bonus: it supports ignoring "junk" parts (e.g. spaces or punctuation).

from difflib import SequenceMatcher

a = 'kitten'
b = 'sitting'

required_edits = [
    code
    for code in (
        SequenceMatcher(a=a, b=b, autojunk=False)
        .get_opcodes()
    )
    if code[0] != 'equal'
]
required_edits
# [
#    # (tag, i1, i2, j1, j2)
#    ('replace', 0, 1, 0, 1), # replace a[0:1]="k" with b[0:1]="s"
#    ('replace', 4, 5, 4, 5), # replace a[4:5]="e" with b[4:5]="i"
#    ('insert', 6, 6, 6, 7),  # insert b[6:7]="g" after a[6:6]="n"
# ]


# the edit distance:
len(required_edits)  # == 3
1
  • 1
    Running this for '123' and '12345' produces a required_edits of length 1, while the edit distance is 2. – Russ Oct 14 '20 at 21:39
0

Instead of going with Levenshtein distance algo use BK tree or TRIE, as these algorithms have less complexity then edit distance. A good browse over these topic will give a detailed description.

This link will help you more about spell checking.

0

You need Minimum Edit Distance for this task.

Following is my version of MED a.k.a Levenshtein Distance.

def MED_character(str1,str2):
    cost=0
    len1=len(str1)
    len2=len(str2)

    #output the length of other string in case the length of any of the string is zero
    if len1==0:
        return len2
    if len2==0:
        return len1

    accumulator = [[0 for x in range(len2)] for y in range(len1)] #initializing a zero matrix

    # initializing the base cases
    for i in range(0,len1):
        accumulator[i][0] = i;
    for i in range(0,len2):
        accumulator[0][i] = i;

    # we take the accumulator and iterate through it row by row. 
    for i in range(1,len1):
        char1=str1[i]
        for j in range(1,len2):
            char2=str2[j]
            cost1=0
            if char1!=char2:
                cost1=2 #cost for substitution
            accumulator[i][j]=min(accumulator[i-1][j]+1, accumulator[i][j-1]+1, accumulator[i-1][j-1] + cost1 )

    cost=accumulator[len1-1][len2-1]
    return cost

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