On the Hamilton-Waterloo Problem with cycle lengths of distinct parities

Abstract

Let Kv* denote the complete graph Kv if v is odd and Kv-I, the complete graph with the edges of a 1-factor removed, if v is even. Given non-negative integers v, M, N, α, β, the Hamilton-Waterloo problem asks for a 2-factorization of K*v into α CM-factors and β CN-factors. Clearly, M,N≥ 3, M v, N v and α+β = v-12 are necessary conditions. Very little is known on the case where M and N have different parities. In this paper, we make some progress on this case by showing, among other things, that the above necessary conditions are sufficient whenever M|N, v>6N>36M, and β≥ 3.