On Turán Number of Graphs with Small Minimum Feedback Vertex Numbers

Abstract

Given a graph H, the minimum feedback vertex number of H is the minimum number of vertices whose removal results in an acyclic graph. In this paper, we investigate Turán-type extremal problems for bipartite graphs in terms of their feedback vertex number. Our first result concerns bipartite graphs H with minimum feedback vertex number one. Such graphs can be obtained from a forest by identifying a specified collection of leaves into a single vertex. For these graphs, we show that ex(n, H) is upper bounded by O(n1+1/k), where 2k is the length of the shortest cycle contained in H. In addition, we consider a family of bipartite graphs with minimum feedback vertex number three. Let Ek,t be the graph obtained from the theta graph θk,t by joining a new vertex x to one side of the bipartition and another vertex y to the other. Let E+k,t denote the graph obtained by adding the edge xy to Ek,t. We prove that for any k≥ 2 and sufficiently large t, ex(n, E+k,t)= Θ(n3k-12k-1).

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