Indecomposable 1-factorizations of the complete multigraph λ K2n for every λ≤ 2n

Abstract

A 1-factorization of the complete multigraph λ K2n is said to be indecomposable if it cannot be represented as the union of 1-factorizations of λ0 K2n and (λ-λ0) K2n, where λ0<λ. It is said to be simple if no 1-factor is repeated. For every n≥ 9 and for every (n-2)/3≤λ≤ 2n, we construct an indecomposable 1-factorization of λ K2n which is not simple. These 1-factorizations provide simple and indecomposable 1-factorizations of λ K2s for every s≥ 18 and 2≤λ≤ 2 s/2-1. We also give a generalization of a result by Colbourn et al. which provides a simple and indecomposable 1-factorization of λ K2n, where 2n=pm+1, λ=(pm-1)/2, p prime.