# How to find one hamiltonian path in cube((2n)^3)?

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?;

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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.

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Do you have a proof for Gray codes are Hamiltonian cycles? –  Phpdna 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? –  Phpdna 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? –  Phpdna Nov 23 '11 at 10:25