Spectral supersaturation: Triangles and bowties
Abstract
Recently, Ning and Zhai (2023) proved that every -vertex graph with has at least triangles, unless . The aim of this paper is two-fold. Using the supersaturation-stability method, we prove a stability variant of Ning-Zhai's result by showing that such a graph contains at least triangles if no vertex is in all triangles of . This result could also be viewed as a spectral version of a result of Xiao and Katona (2021). The second part concerns with the spectral supersaturation for the bowtie, which consists of two triangles sharing a common vertex. A theorem of Erd\H{o}s, F\"{u}redi, Gould and Gunderson (1995) says that every -vertex graph with more than edges contains a bowtie. For graphs of given order, the spectral supersaturation problem has not been considered for substructures that are not color-critical. In this paper, we give the first such theorem by counting the number of bowties. Let be the graph obtained from by embedding two disjoint edges into the vertex part of size . Our result shows that every graph with vertices and contains at least bowties, and is the unique spectral extremal graph. This gives a spectral correspondence of a theorem of Kang, Makai and Pikhurko (2020). The method used in our paper provides a probable way to establish the spectral counting results for other graphs, even for non-color-critical graphs.
Cite
@article{arxiv.2407.04950,
title = {Spectral supersaturation: Triangles and bowties},
author = {Yongtao Li and Lihua Feng and Yuejian Peng},
journal= {arXiv preprint arXiv:2407.04950},
year = {2025}
}
Comments
32 pages. Some spectral extremal graph problems are proposed. Any suggestions are welcome