Enclosings of Decompositions of Complete Multigraphs in 2-Factorizations

Abstract

Let k, λ and μ be positive integers. A decomposition of a multigraph λ G into edge-disjoint subgraphs G1, … , Gk is said to be enclosed by a decomposition of a multigraph μ H into edge-disjoint subgraphs H1, … , Hk if μ > λ and Gi is a subgraph of Hi, 1 ≤ i ≤ k. In this paper we initiate the study of when a decomposition can be enclosed by a decomposition that consists of spanning subgraphs. A decomposition of a graph is a 2-factorization if each subgraph is 2-regular and is Hamiltonian if each subgraph is a Hamiltonian cycle. Let n and m be positive integers. We give necessary and sufficient conditions for enclosing a decomposition of λ Kn in a 2-factorization of μ Kn+m whenever μ>λ and m ≥ n-2. We also give necessary and sufficient conditions for enclosing a decomposition of λ Kn in a Hamiltonian decomposition of μ Kn+m whenever μ > λ and m ≥ n-1, or μ > λ, n=3 and m=1, or μ = 2, λ=1 and m=n-2.