Small subgraphs with large average degree

Abstract

In this paper we study the fundamental problem of finding small dense subgraphs in a given graph. For a real number s>2, we prove that every graph on n vertices with average degree at least d contains a subgraph of average degree at least s on at most nd-ss-2( d)Os(1) vertices. This is optimal up to the polylogarithmic factor, and resolves a conjecture of Feige and Wagner. In addition, we show that every graph with n vertices and average degree at least n1-2s+ contains a subgraph of average degree at least s on O,s(1) vertices, which is also optimal up to the constant hidden in the O(.) notation, and resolves a conjecture of Verstra\"ete.

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