The maximum number of cliques in disjoint copies of graphs
Abstract
The problem of determining the maximum number of copies of T in an H-free graph, for any graphs T and H, was considered by Alon and Shikhelman. This is a variant of Tur\'an's classical extremal problem. We show lower and upper bounds for the maximum number of s-cliques in a graph with no disjoint copies of arbitrary graph. We also determine the maximum number of s-cliques in an n-vertex graph that does not contain a disjoint union of k paths of length two when k=2,3, or s≥slant k+2, or n is sufficiently large, this partly confirms a conjecture posed by Chen, Yang, Yuan, and Zhang 2024Chen113974.
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