Almost regular subgraphs under spectral radius constrains

Abstract

A graph is called K-almost regular if its maximum degree is at most K times the minimum degree. Erdos and Simonovits showed that for a constant 0< < 1 and a sufficiently large integer n, any n-vertex graph with more than n1+ edges has a K-almost regular subgraph with n'≥ n1-1+ vertices and at least 25n'1+ edges. An interesting and natural problem is whether there exits the spectral counterpart to Erdos and Simonovits's result. In this paper, we will completely settle this issue. More precisely, we verify that for constants 12<≤ 1 and c>0, if the spectral radius of an n-vertex graph G is at least cn, then G has a K-almost regular subgraph of order n'≥ n22-24 with at least c'n'1+ edges, where c' and K are constants depending on c and . Moreover, for 0<≤12, there exist n-vertex graphs with spectral radius at least cn that do not contain such an almost regular subgraph. Our result has a wide range of applications in spectral Tur\'an-type problems. Specifically, let ex(n,H) and spex(n,H) denote, respectively, the maximum number of edges and the maximum spectral radius among all n-vertex H-free graphs. We show that for 1≥ > 12, ex(n,H) = O(n1+) if and only if spex(n,H) = O(n).