Nordhaus-Gaddum-type theorems for maximum average degree

Abstract

A k-decomposition (G1,…,Gk) of a graph G is a partition of its edge set into k spanning subgraphs G1,…,Gk. The classical theorem of Nordhaus and Gaddum bounds (G1) + (G2) and (G1) (G2) over all 2-decompositions of Kn. For a graph parameter p, let p(k,G) = \ Σi=1k p(Gi) \, taken over all k-decompositions of graph G. In this paper we consider M(k,Kn) = M(k,n) = \ Σi=1k Mad(Gi) \, taken over all k-decompositions of the complete graph Kn, where Mad(G) denotes the maximum average degree of G, Mad(G) = \ 2e(H)/|H| : H ⊂eq G \ = \d(H) : H ⊂eq G \. Among the many results obtained in this paper we mention the following selected ones. (1) M(k, n) < k n, and k∞ ( n∞ M(k,n)k\,n ) = 1. (2) Exact determination of M(2,n). (3) Exact determination of M(k,n) when k = n2 - t, 0 ≤ t≤ (n-1)2/3. Applications of these bounds to other parameters considered before in the literature are given.