Extremal graphs for odd-ballooning of paths and stars
Abstract
The odd-ballooning of a graph G, denoted by Gq, is the graph obtained from replacing each edge in G by a odd cycle of the same size where the new vertices of the odd cycles are all different. In 2002, Erd\"os et al. determined the extremal graphs of k-fan. In 2016, Hou et al. determined extremal graphs of the odd-ballooning of stars for q≥slant 5. In 2020, Zhu et al. determined extremal graphs of the odd-ballooning of paths for q≥slant 3. In this article, we use progressive induction lemma of Simonovits to determine the extremal graphs of both odd-ballooning of stars and odd-ballooning of paths for q≥slant 3.
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