Leaper Tours

Abstract

Let p and q be positive integers. The (p, q)-leaper L is a generalised knight which leaps p units away along one coordinate axis and q units away along the other. Consider a free L, meaning that p + q is odd and p and q are relatively prime. We prove that L tours the board of size 4pq × n for all sufficiently large positive integers n. Combining this with the recently established conjecture of Willcocks which states that L tours the square board of side 2(p + q), we conclude that furthermore L tours all boards both of whose sides are even and sufficiently large. This, in particular, completely resolves the question of the Hamiltonicity of leaper graphs on sufficiently large square boards.