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I am working on a leetcode problem "wordLadder"

Given two words (beginWord and endWord), and a dictionary's word list, find the length of shortest transformation sequence from beginWord to endWord, such that:

  1. Only one letter can be changed at a time.
  2. Each transformed word must exist in the word list. Note that beginWord is not a transformed word.

Note:

  • Return 0 if there is no such transformation sequence.
  • All words have the same length.
  • All words contain only lowercase alphabetic characters.
  • You may assume no duplicates in the word list.
  • You may assume beginWord and endWord are non-empty and are not the same.

Example 1:

Input:
beginWord = "hit",
endWord = "cog",
wordList = ["hot","dot","dog","lot","log","cog"]

Output: 5

Explanation: As one shortest transformation is "hit" -> "hot" -> "dot" -> "dog" -> "cog",
return its length 5.

Example 2:

Input:
beginWord = "hit"
endWord = "cog"
wordList = ["hot","dot","dog","lot","log"]

Output: 0

Explanation: The endWord "cog" is not in wordList, therefore no possible transformation.

my solution

class Solution:
    def ladderLength(self, beginWord, endWord, wordList):
        visited = set()
        wordSet = set(wordList)

        queue = [(beginWord, 1)]

        while len(queue) > 0:
            word, step = queue.pop(0)
            logging.debug(f"word: {word}, step:{step}")

            #base case 
            if word == endWord:
                return step #get the result.
            if word in visited: #better than multiple conditions later.
                continue

            for i in range(len(word)):
                for j in range(0, 26): 
                    ordinal = ord('a') + j
                    next_word = word[0:i] + chr(ordinal) + word[i + 1:]
                    logging.debug(f"changed_word: {next_word}")
                    if next_word in wordSet: 
                        queue.append((next_word, step + 1))
            visited.add(word) # paint word as visited

        return 0 

To exhaust all the possible combination of a word

enter image description here

I read the discussion area, all employed the slice techniques

next_word = word[0:i] + chr(ordinal) + word[i + 1:]

Is there other solutions to handle the problem?

1

This is a classical networking problem. What you should do is generate a square Matrix with dimensions equal to the number of words in your dictionary. Then fill the matrix with ones wherever the words are a one letter transformation towards each other i.e. network['hot']['not'] = 1 all other cells need to be 0. Now you defined your network, and you can use a shortest path allgorithm like Dijkstra in order to solve your Problem

  • No, Dijkstra is for a weighted graph. – Alice Apr 3 at 10:19
  • you're right, however, the Graph at hand is just a special case for a weighted graph, namely, all weights are equal to 1, if you want to get the last bit of efficency out of your code, a different algorithm might be more appropriate, but then you probably shouldnt use python to solve this... Also sorry, if im confusing you, by suggesting Dijkstra, it has been years since doing this at Uni :D – Lucas Apr 3 at 10:24

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