Extremal graphs for the suspension of edge-critical graphs

Abstract

The Tur\'an number of a graph H, ex(n,H), is the maximum number of edges in an n-vertex graph that does not contain H as a subgraph. For a vertex v and a multi-set F of graphs, the suspension F+v of F is the graph obtained by connecting the vertex v to all vertices of F for each F∈ F. For two integers k1 and r2, let Hi be a graph containing a critical edge with chromatic number r for any i∈\1,…,k\, and let H=\H1,…,Hk\+v. In this paper, we determine ex(n, H) and characterize all the extremal graphs for sufficiently large n. This generalizes a result of Chen, Gould, Pfender and Wei on intersecting cliques. We also obtain a stability theorem for H, extending a result of Roberts and Scott on graphs containing a critical edge.

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