Extremal graphs for edge blow-up of lollipops

Abstract

Given a graph H and an integer p (p≥ 2), the edge blow-up Hp+1 of H is the graph obtained from replacing each edge in H by a clique of order (p+1), where the new vertices of the cliques are all distinct. The Tur\'an numbers for edge blow-up of matchings were first studied by Erdos and Moon. Very recently some substantial progress of the extremal graphs for Hp+1 of larger p has been made by Yuan. The range of Tur\'an numbers for edge blow-up of all bipartite graphs when p≥ 3 and the exact Tur\'an numbers for edge blow-up of all non-bipartite graphs when p≥ (H) +1 has been determined by Yuan (2022), where (H) is the chromatic number of H. A lollipop Ck,\; is the graph obtained from a cycle Ck by appending a path P+1 to one of its vertices. In this paper, we consider the extremal graphs for Ck,\;p+1 of the rest cases p=2 and p=3.