On Hamiltonian cycles in balanced k-partite graphs

Abstract

For all integers k with k≥ 2, if G is a balanced k-partite graph on n≥ 3 vertices with minimum degree at least \[ n2+n+22k+12-nk=cases n2+n+2k+1-nk & : k odd \\ n2+n+2k+2-nk & : k even cases, \] then G has a Hamiltonian cycle unless k=2 and 4 divides n, or k=n2 and 4 divides n. In the case where k=2 and 4 divides n, or k=n2 and 4 divides n, we can characterize the graphs which do not have a Hamiltonian cycle and see that n2+n+22k+12-nk+1 suffices. This result is tight for all k≥ 2 and n≥ 3 divisible by k.