Decreasing the maximum average degree by deleting an independent set or a d-degenerate subgraph

Abstract

The maximum average degree mad(G) of a graph G is the maximum average degree over all subgraphs of G. In this paper we prove that for every G and positive integer k such that mad(G) k there exists S ⊂eq V(G) such that mad(G - S) mad(G) - k and G[S] is (k-1)-degenerate. Moreover, such S can be computed in polynomial time. In particular there exists an independent set I in G such that mad(G-I) mad(G)-1 and an induced forest F such that mad(G-F) mad(G) - 2.