Enclosings of Decompositions of Complete Multigraphs in 2-Edge-Connected r-Factorizations

Abstract

A decomposition of a multigraph G is a partition of its edges into subgraphs G(1), … , G(k). It is called an r-factorization if every G(i) is r-regular and spanning. If G is a subgraph of H, a decomposition of G is said to be enclosed in a decomposition of H if, for every 1 ≤ i ≤ k, G(i) is a subgraph of H(i). Feghali and Johnson gave necessary and sufficient conditions for a given decomposition of λ Kn to be enclosed in some 2-edge-connected r-factorization of μ Km for some range of values for the parameters n, m, λ, μ, r: r=2, μ>λ and either m ≥ 2n-1, or m=2n-2 and μ = 2 and λ=1, or n=3 and m=4. We generalize their result to every r ≥ 2 and m ≥ 2n - 2. We also give some sufficient conditions for enclosing a given decomposition of λ Kn in some 2-edge-connected r-factorization of μ Km for every r ≥ 3 and m = (2 - C)n, where C is a constant that depends only on r, λ and~μ.