Publications [#372536] of Fan Wei

Papers Published

1. Fox, J; Wei, F, On the number of cliques in graphs with a forbidden minor, Journal of Combinatorial Theory Series B, vol. 126 (September, 2017), pp. 175-197 [doi]
   (last updated on 2025/07/05)

   Abstract:
   Reed and Wood and independently Norine, Seymour, Thomas, and Wollan proved that for each positive integer t there is a constant c(t) such that every graph on n vertices with no Kt-minor has at most c(t)n cliques. Wood asked in 2007 if we can take c(t)=c^t for some absolute constant c. This question was recently answered affirmatively by Lee and Oum. In this paper, we determine the exponential constant. We prove that every graph on n vertices with no Kt-minor has at most 3^2t/3+o(t)n cliques. This bound is tight for n≥4t/3. More generally, let H be a connected graph on t vertices, and x denote the size (i.e., the number edges) of the largest matching in the complement of H. We prove that every graph on n vertices with no H-minor has at most max⁡(3^{2t/3−x/3+o(t)}n,2^t+o(t)n) cliques, and this bound is tight for n≥max⁡(4t/3−2x/3,t) by a simple construction. Even more generally, we determine explicitly the exponential constant for the maximum number of cliques an n-vertex graph can have in a minor-closed family of graphs which is closed under disjoint union.