Non-r-partite graphs without complete split subgraphs

Abstract

The classical Simonovits' chromatic critical edge theorem shows that for sufficiently large n, if H is an edge-color-critical graph with (H)=p+1 3, then the Tur\'an graph Tn,p is the unique extremal graph with respect to ex(n,H). Denote by EXr+1(n,H) and SPEXr+1(n,H) the family of n-vertex H-free non-r-partite graphs with the maximum size and with the spectral radius, respectively. Li and Peng [SIAM J. Discrete Math. 37 (2023) 2462--2485] characterized the unique graph in SPEXr+1(n,Kr+1) for r≥ 2 and showed that SPEXr+1(n,Kr+1)⊂eq EXr+1(n,Kr+1). It is interesting to study the extremal or spectral extremal problems for color-critical graph H in non-r-partite graphs. For p≥ 2 and q≥ 1, we call the graph Bp,q:=Kp∇ qK1 a complete split graph (or generalized book graph). In this note, we determine the unique spectral extremal graph in SPEXr+1(n,Bp,q) and show that SPEXr+1(n,Bp,q)⊂eq EXr+1(n,Bp,q) for sufficiently large n.