Threshold Graphs Maximize Homomorphism Densities
Abstract
Given a fixed graph and a constant , we can ask what graphs with edge density asymptotically maximize the homomorphism density of in . For all for which this problem has been solved, the maximum is always asymptotically attained on one of two kinds of graphs: the quasi-star or the quasi-clique. We show that for any the maximizing is asymptotically a threshold graph, while the quasi-clique and the quasi-star are the simplest threshold graphs, having only two parts. This result gives us a unified framework to derive a number of results on graph homomorphism maximization, some of which were also found quite recently and independently using several different approaches. We show that there exist graphs and densities such that the optimizing graph is neither the quasi-star nor the quasi-clique, reproving a result of Day and Sarkar. We also show that for large enough all graphs maximize on the quasi-clique, which was also recently proven by Gerbner et al., and for any the density of is always maximized on either the quasi-star or the quasi-clique, which was originally shown by Ahlswede and Katona. Finally, we extend our results to uniform hypergraphs.
Keywords
Cite
@article{arxiv.2002.12117,
title = {Threshold Graphs Maximize Homomorphism Densities},
author = {Grigoriy Blekherman and Shyamal Patel},
journal= {arXiv preprint arXiv:2002.12117},
year = {2023}
}
Comments
We improve the exposition of the paper and correct our proof for uniform hypergraphs. Additionally, we removed our rederivation of a result of Janson et al. on maximizing homomorphism counts due to an error in the proof of Lemma 4.3