On Alphatrion's Conjecture about Hamiltonian paths in hypercubes

Abstract

Alphatrion conjectured that it is possible to label the vertices of an n-dimensional hypercube with distinct positive integers such that for every Hamiltonian path a1, …, a2n, we have ai + ai+1 prime for all i. We prove the conjecture by proving the more general result that a graph G = (V, E) can be labeled with distinct positive integers such that the edge sum for all e ∈ E is prime if and only if G is bipartite.