Stack Overflow is a community of 4.7 million programmers, just like you, helping each other.

Join them; it only takes a minute:

Sign up
Join the Stack Overflow community to:
  1. Ask programming questions
  2. Answer and help your peers
  3. Get recognized for your expertise

I solve acm-icpc problem a kind of graph theory.

Traveling Spiders is a logical puzzle that needs a sequence of systematic choices among many alternatives. The puzzle assumes a geometric object whose surface is partitioned into a set of areas called cells that are usually congruent, or very similar in their shapes and sizes. A spider may move around freely on the surface of the object, but, can move forward from a cell to only one of its neighboring cells in each step. Now, given some pairs of male and female spiders, initially positioned all in different cells, we want to find a set of paths that, respectively, leads each male spider to his partner. The only condition is that every cell of the object must be visited once and only once by a male spider during their traversal.

the cube exists in the space [0, 2n] x [0, 2n] x [0, 2n], and n can be 2 <= n <= 50.

we have to find one hamiltonian path when I game two position start from A to B.

and print all of path(1 0 1 -> 1 0 3 -> .... -> 3 1 4).

My friend said it is can't see general answer. because It is quite difficult to exact planar graph. and It cannot judge hamiltonian path or not.

how I can find hamiltonian path in general case?;

share|improve this question
up vote 3 down vote accepted

Looks like Gray code problem, specifically n-ary Gray code.

Gray codes are Hamiltonian cycles, but you are looking for a Hamiltonian path with end vertices A and B. I'm not sure, but maybe Monotonic Gray codes can help. If cube vertices can be partitioned in V_i, so that V_0 = {A}, V_n = {B}, than construction in article can solve problem.

Edit: There is a reference, on Wikipedia page, to Knuth's draft of n-tuple generation from The Art Volume 4A.

share|improve this answer
Do you have a proof for Gray codes are Hamiltonian cycles? – Betterdev Nov 23 '11 at 9:42
@David: It is by construction. H_n is union of 0 + H_{n-1} and 1 + inverse H_{n-1}. – Ante Nov 23 '11 at 10:04
But the union is also true for the other 5 gray codes in a rubic cube i.e. octree. Isn't this just a recursive function? Why is a gray code a hamiltonian cycle? – Betterdev Nov 23 '11 at 10:14
I think that Gray code is cycle by definition. – Ante Nov 23 '11 at 10:20
Not hamiltonian cycle? – Betterdev Nov 23 '11 at 10:25

The problem is NP complete and you need to brute force every possible path. See here: Algorithms to find the number of Hamiltonian paths in a graph. However, in your task there is a shortcut because it's a rubic cube and a gray code traversal of a rubics cube is a hamiltonian path. There are 6 ways of a gray code traversal of a rubic cube. For example if you have an octree and you find a hamiltonian path most likely you have found a space-filling-curve reducing the 3d to a 1d complexity. Then you can sort the path from top to bottom or from bottom to top. When you have the other 5 space-filling-curves you can have other lists. Here is a link that explains the difference between an euler path and a hamiltonian path: difference between hamiltonian path and euler path. Here is an example of a hilbert curve and it uses a binary-reflected code, not a n-ary code or a monotonic gray code.

share|improve this answer
I don't think he wants all paths, just one. "print all of path" -- I understand this as "print all the steps in the path you found". – Tom Sirgedas Nov 23 '11 at 21:44

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.