On the size of (Kt,Tk)-co-critical graphs

Abstract

Given an integer r1 and graphs G, H1, …, Hr, we write G → (H1, …, Hr) if every r-coloring of the edges of G contains a monochromatic copy of Hi in color i for some i∈\1, …, r\. A non-complete graph G is (H1, …, Hr)-co-critical if G (H1, …, Hr), but G+e→ (H1, …, Hr) for every edge e in G. In this paper, motivated by Hanson and Toft's conjecture [Edge-colored saturated graphs, J Graph Theory 11(1987), 191--196], we study the minimum number of edges over all (Kt, Tk)-co-critical graphs on n vertices, where Tk denotes the family of all trees on k vertices. Following Day [Saturated graphs of prescribed minimum degree, Combin. Probab. Comput. 26 (2017), 201--207], we apply graph bootstrap percolation on a not necessarily Kt-saturated graph to prove that for all t4 and k \6, t\, there exists a constant c(t, k) such that, for all n (t-1)(k-1)+1, if G is a (Kt, Tk)-co-critical graph on n vertices, then e(G) (4t-92+12 k2 )n-c(t, k). Furthermore, this linear bound is asymptotically best possible when t∈\4,5\ and k6. The method we develop in this paper may shed some light on attacking Hanson and Toft's conjecture.