Supersaturation of Even Linear Cycles in Linear Hypergraphs

Abstract

A classic result of Erdos and, independently, of Bondy and Simonovits says that the maximum number of edges in an n-vertex graph not containing C2k, the cycle of length 2k, is O( n1+1/k). Simonovits established a corresponding supersaturation result for C2k's, showing that there exist positive constants C,c depending only on k such that every n-vertex graph G with e(G)≥ Cn1+1/k contains at least c(e(G)v(G))2k many copies of C2k, this number of copies tightly achieved by the random graph (up to a multiplicative constant). In this paper, we extend Simonovits' result to a supersaturation result of r-uniform linear cycles of even length in r-uniform linear hypergraphs. Our proof is self-contained and includes the r=2 case. As an auxiliary tool, we develop a reduction lemma from general host graphs to almost-regular host graphs that can be used for other supersaturation problems, and may therefore be of independent interest.