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Let S be a set of 10 digit numbers. Given any two numbers v and w in S, I'd like to know if there is a sequence of numbers v=u_0, u_1, ... , u_k=w such that:

  1. each u_i is in S
  2. for each i=1,..,k, the numbers u_{i-1} and u_i differ in exactly one position

As a plus, it would be even better to find an algorithm to find the shortest such sequence.

Ideally, I would prefer a C (or pseudo-code) solution, but I really, really appreciate any and all suggestions on this one! Thanks!

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2  
If you folks voting to close would give me a hint as to why you're doing so, I would very much appreciate it. Thanks. –  PengOne Mar 23 '11 at 17:46
    
There are currently 2 votes to close this as "not being a real question", probably because it's too open. It's not a programming question, it's more of a question for someone to provide you with an algorithm. –  unwind Mar 23 '11 at 17:53
2  
I'd imagine it is because there is no code and is a high level algorithm question. But I'm not a downvoter. My suggestion would be a breadth first search, or A*. –  user7116 Mar 23 '11 at 17:53
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This is silly. Just because people don't understand the terms, they try to close it. This just seems like a graph problem of finding shortest paths. –  Aryabhatta Mar 23 '11 at 17:55
    
What programming puzzle is this? It's a bit unnatural to model this using digits in a number, standard would be to use vectors. –  starblue Mar 23 '11 at 19:31

2 Answers 2

up vote 3 down vote accepted

Form a graph from elements of S: u and v are adjacent iff they differ in exactly one coordinate.

Now given u, do a breadth first search till you hit v.

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I would convert S to a graph of node objects, where each node object contains links to the adjacent nodes. (In some programming languages, read 'links' as 'pointers'.) Adjacency is defined by your condition 2 on the sequence, so that any path through the resulting graph is a sequence matching the two conditions.

From there, it's a simple problem of checking for connectedness of two vertices in your graph. The simplest solution is a breadth-first search. (That particular algorithm also happens to find the shortest path(s).)

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