The spectral Turán problem: Characterizing spectral-consistent graphs (2508.12070v1)

Abstract: Let ${\rm EX}(n,H)$ and ${\rm SPEX}(n,H)$ denote the families of $n$-vertex $H$-free graphs with the maximum size and the maximum spectral radius, respectively. A graph $H$ is said to be spectral-consistent if ${\rm SPEX}(n,H)\subseteq {\rm EX}(n,H)$ for sufficiently large $n$. A fundamental problem in spectral extremal graph theory is to determine which graphs are spectral-consistent. Cioab\u{a}, Desai and Tait [European J. Combin. 99 (2022) 103420] proposed the following conjecture: Let $H$ be any graph such that the graphs in ${\rm EX}(n,H)$ are Tur\'{a}n graph plus $O(1)$ edges. Then $H$ is spectral-consistent. Wang, Kang and Xue [J. Combin. Theory Ser. B 159 (2023) 20--41] confirmed this conjecture, along with a stronger result. In this paper, we continue to explore the spectral-consistent problem. We prove that for any finite graph $H$, if $\mathcal{M}(H)$ is matching-good, then $H$ is spectral-consistent. This provides a weaker condition than the one presented by Wang, Kang, and Xue for guaranteeing that $H$ is spectral-consistent. This result allows us to characterize spectral-consistency for several important classes of forbidden graphs $H$: generalized color-critical graphs (including the Petersen graph and the dodecahedron graph), and the odd-ballooning of trees or complete bipartite graphs. Moreover, we provide a concise proof for a spectral-consist result by Chen, Lei and Li [European J. Combin. 130 (2025) 104226]. Additionally, we propose problems for future research.