Extremal number of cliques of given orders in graphs with a forbidden clique minor

Abstract

Alon and Shikhelman initiated the systematic study of a generalization of the extremal function. Motivated by algorithmic applications, the study of the extremal function ex(n, Kk, Kt-minor), i.e., the number of cliques of order k in Kt-minor free graphs on n vertices, has received much attention. In this paper, we determine essentially sharp bounds on the maximum possible number of cliques of order k in a Kt-minor free graph on n vertices. More precisely, we determine a function C(k,t) such that for each k < t with t-k 2 t, every Kt-minor free graph on n vertices has at most n C(k, t)1+ot(1) cliques of order k. We also show this bound is sharp by constructing a Kt-minor-free graph on n vertices with C(k, t) n cliques of order k. This bound answers a question of Wood and Fox-Wei asymptotically up to ot(1) in the exponent except the extreme values when k is very close to t.