Generalized Tur\'an problems for even cycles

Abstract

Given a graph H and a set of graphs F, let ex(n,H, F) denote the maximum possible number of copies of H in an F-free graph on n vertices. We investigate the function ex(n,H, F), when H and members of F are cycles. Let Ck denote the cycle of length k and let Ck=\C3,C4,…,Ck\. Some of our main results are the following. (i) We show that ex(n, C2l, C2k) = (nl) for any l, k 2. Moreover, we determine it asymptotically in the following cases: We show that ex(n,C4,C2k) = (1+o(1)) (k-1)(k-2)4 n2 and that the maximum possible number of C6's in a C8-free bipartite graph is n3 + O(n5/2). (ii) Solymosi and Wong proved that if Erdos's Girth Conjecture holds, then for any l 3 we have ex(n,C2l, C2l-1)=(n2l/(l-1)). We prove that forbidding any other even cycle decreases the number of C2l's significantly: For any k > l, we have ex(n,C2l, C2l-1 \C2k\)=(n2). More generally, we show that for any k > l and m 2 such that 2k ≠ ml, we have ex(n,Cml, C2l-1 \C2k\)=(nm). (iii) We prove ex(n,C2l+1, C2l)=(n2+1/l), provided a strong version of Erdos's Girth Conjecture holds (which is known to be true when l = 2, 3, 5). Moreover, forbidding one more cycle decreases the number of C2l+1's significantly: More precisely, we have ex(n, C2l+1, C2l \C2k\) = O(n2-1l+1), and ex(n, C2l+1, C2l \C2k+1\) = O(n2) for l > k 2. (iv) We also study the maximum number of paths of given length in a Ck-free graph, and prove asymptotically sharp bounds in some cases.