Maximizing subgraph counts in regular graphs
Combinatorics
2026-03-30 v2
Abstract
Given a graph , we investigate the -regular graphs with the highest -density. We reframe the problem as a continuous optimization problem on the eigenvalues of by relating injective homomorphism numbers from and homomorphism numbers from quotient graphs of . For almost all , this relation has non-spectral terms, which require bounding by spectral terms in a way that is sharp at the optimal graph. For bipartite and large enough, we show consists of disjoint copies of . For non-bipartite and sufficiently large, is a collection of disjoint graphs. For and , disjoint Petersen graphs emerge.
Cite
@article{arxiv.2601.20988,
title = {Maximizing subgraph counts in regular graphs},
author = {Gabor Lippner and Arturo Ortiz San Miguel},
journal= {arXiv preprint arXiv:2601.20988},
year = {2026}
}
Comments
Added context and references on generalized Turan numbers