On the Hamilton-Waterloo Problem with triangle factors and C3x-factors

Abstract

The Hamilton-Waterloo Problem (HWP) in the case of Cm-factors and Cn-factors asks if Kv, where v is odd (or Kv-F, where F is a 1-factor and v is even), can be decomposed into r copies of a 2-factor made either entirely of m-cycles and s copies of a 2-factor made entirely of n-cycles. In this paper, we give some general constructions for such decompositions and apply them to the case where m=3 and n=3x. We settle the problem for odd v, except for a finite number of x values. When v is even, we make significant progress on the problem, although open cases are left. In particular, the difficult case of v even and s=1 is left open for many situations.