Generalized Tur\'an problems for even cycles
Abstract
Given a graph and a set of graphs , let denote the maximum possible number of copies of in an -free graph on vertices. We investigate the function , when and members of are cycles. Let denote the cycle of length and let . Some of our main results are the following. (i) We show that for any . Moreover, we determine it asymptotically in the following cases: We show that and that the maximum possible number of 's in a -free bipartite graph is . (ii) Solymosi and Wong proved that if Erd\H{o}s's Girth Conjecture holds, then for any we have . We prove that forbidding any other even cycle decreases the number of 's significantly: For any , we have More generally, we show that for any and such that , we have (iii) We prove provided a strong version of Erd\H{o}s's Girth Conjecture holds (which is known to be true when ). Moreover, forbidding one more cycle decreases the number of 's significantly: More precisely, we have and for . (iv) We also study the maximum number of paths of given length in a -free graph, and prove asymptotically sharp bounds in some cases.
Keywords
Cite
@article{arxiv.1712.07079,
title = {Generalized Tur\'an problems for even cycles},
author = {Dániel Gerbner and Ervin Győri and Abhishek Methuku and Máté Vizer},
journal= {arXiv preprint arXiv:1712.07079},
year = {2018}
}
Comments
37 Pages; Substantially revised, contains several new results. Mistakes corrected based on the suggestions of a referee