New results on large induced forests in graphs

Abstract

For a graph G, let a(G) denote the maximum size of a subset of vertices that induces a forest. We prove the following. 1. Let G be a graph of order n, maximum degree >0 and maximum clique size ω. Then \[ a(G) ≥ 6n2 + ω +2. \] This bound is sharp for cliques. 2. Let G=(V,E) be a triangle-free graph and let d(v) denote the degree of v ∈ V. Then \[ a(G) ≥ Σv ∈ V (1, 3d(v)+2 ). \] As a corollary we have that a triangle-free graph G of order n, with m edges and average degree d ≥ 2 satisfies \[ a(G) ≥ 3nd+2. \] This improves the lower bound n - m4 of Alon-Mubayi-Thomas for graphs of average degree greater than 4. Furthermore it improves the lower bound 20n - 5m - 519 of Shi-Xu for (connected) graphs of average degree at least 92.