Spectral extremal results for triangle-free graphs with chromatic number at least four

Abstract

A graph is called F-free if it does not contain a copy of F. Let G(r,s) denote a Kr+1-free graph of order n with chromatic number at least s that maximizes the spectral radius. Nikiforov [Linear Algebra Appl., 2007] proved the spectral Turán theorem, which implies that G(r,s) is the r-partite Turán graph Tn,r for s≤ r. Lin, Ning, and Wu [Combin. Probab. Comput., 2021] characterized the unique spectral extremal graph G(2,3). This result was later extended by Li and Peng [SIAM J. Discrete Math., 2023] to all s=r+1≥ 3. In this paper, we push the characterization further by determining the unique extremal graph G(2,4) for all sufficiently large n. Specifically, we show that G(2,4) is precisely a blow-up of the Grötzsch graph. Interestingly, under the same conditions, G(2,4) also coincides with the unique edge-extremal graph identified by Ren, Wang, Wang, and Yang [arXiv:2404.07486v2].