English

Homomorphism counts in robustly sparse graphs

Combinatorics 2021-07-05 v1

Abstract

For a fixed graph HH and for arbitrarily large host graphs GG, the number of homomorphisms from HH to GG and the number of subgraphs isomorphic to HH contained in GG have been extensively studied in extremal graph theory and graph limits theory when the host graphs are allowed to be dense. This paper addresses the case when the host graphs are robustly sparse and proves a general theorem that solves a number of open questions proposed since 1990s and strengthens a number of results in the literature. We prove that for any graph HH and any set H{\mathcal H} of homomorphisms from HH to members of a hereditary class G{\mathcal G} of graphs, if H{\mathcal H} satisfies a natural and mild condition, and contracting disjoint subgraphs of radius O(V(H))O(\lvert V(H) \rvert) in members of G{\mathcal G} cannot create a graph with large edge-density, then an obvious lower bound for the size of H{\mathcal H} gives a good estimation for the size of H{\mathcal H}. This result determines the maximum number of HH-homomorphisms, the maximum number of HH-subgraphs, and the maximum number HH-induced subgraphs in graphs in any hereditary class with bounded expansion up to a constant factor; it also determines the exact value of the asymptotic logarithmic density for HH-homomorphisms, HH-subgraphs and HH-induced subgraphs in graphs in any hereditary nowhere dense class. Hereditary classes with bounded expansion include (topological) minor-closed families and many classes of graphs with certain geometric properties; nowhere dense classes are the most general sparse classes in sparsity theory. Our machinery also allows us to determine the maximum number of HH-subgraphs in the class of all dd-degenerate graphs with any fixed dd.

Keywords

Cite

@article{arxiv.2107.00874,
  title  = {Homomorphism counts in robustly sparse graphs},
  author = {Chun-Hung Liu},
  journal= {arXiv preprint arXiv:2107.00874},
  year   = {2021}
}
R2 v1 2026-06-24T03:49:56.205Z