Extremal graphs for odd-ballooning of bipartite graphs

Abstract

Given a graph H and an odd integer t (t≥ 3), the odd-ballooning of H, denoted by H(t), is the graph obtained from replacing each edge of H by an odd cycle of length at least t where the new vertices of the cycles are all distinct. In this paper, we determine the range of Tur\'an numbers for odd-ballooning of bipartite graphs when t≥ 5. As applications, we may deduce the Tur\'an numbers for odd-ballooning of stars, paths and even cycles.

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