Announcing Stack Overflow Documentation

We started with Q&A. Technical documentation is next, and we need your help.

Whether you're a beginner or an experienced developer, you can contribute.

Sign up and start helping → Learn more about Documentation →

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!

share|improve this question
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
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
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
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.

share|improve this answer

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).)

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.