Tur\'an problems for suspension of a balanced tree

Abstract

The Tur\'an number (n,H) is the maximum number of edges that an n-vertex H-free graph can have. The suspension H is obtained from H by adding a new vertex which is adjacent to all vertices of H and a tree is balanced if the sizes of its two color classes differ at most 1. In this paper, we obtain a sharp bound of (n,T) when n 4(4k)6 based on the Erdos-S\'os conjecture. We also show the bound is sharp for infinitely many n and characterize all extremal graphs. In particular, if T satisfies some conditions such as T contains a matching covering all vertices in one color class, then the bound is sharp for all n. This is a new class of graphs whose decomposition family does not contain a linear forest but we still can determine its Tur\'an number.

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