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:

- each
**u_i**is in**S** - 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!