Counting triangles in graphs with no wheels of order at least five

Abstract

For a family of graphs F, a graph G is said to be F-free if it contains no member of F as a subgraph. A wheel graph Wk is a graph on k+1 vertices formed by joining a new vertex to all vertices of a k-cycle. Given an integer k 3, we consider the problem of determining the maximum number of triangles in a W≥ k-free graph, where W≥ k=\W: ≥ k\. The case k=3 was raised by Gallai, who proposed a conjecture for this case (see Erdős [5]. Gallai's conjecture was disproved by Zhou [17] and independently by Füredi, Goemans, and Kleitman [9]. In this paper, we study the case k=4. Namely, for every integer n 3, we determine the maximum number of triangles in an n-vertex W≥ 4-free graph and characterize all extremal graphs.