The Hamilton-Waterloo Problem for Triangle-Factors and Heptagon-Factors
Abstract
Given 2-factors R and S of order n, let r and s be nonnegative integers with r+s= n-12, the Hamilton-Waterloo problem asks for a 2-factorization of Kn if n is odd, or of Kn-I if n is even, in which r of its 2-factors are isomorphic to R and the other s 2-factors are isomorphic to S. In this paper, we solve the problem for the case of triangle-factors and heptagon-factors for odd n with 3 possible exceptions when n=21.
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