On the Maximum Order of Induced Paths and Induced Forests in Regular Graphs

Abstract

Let G be a graph and a(G), LIF(G) denote the maximum orders of an induced forest and an induced linear forest of G, respectively. It is well-known that if G is an r-regular graph of order n, then a(G) ≥ 2r+1n. In this paper, we generalize this result by showing that LIF(G) ≥ 2r+1n. It was proved that for every graph G, a(G) ≥ Σi=1n2di+1, where d1, …, dn is the degree sequence of G. Here, we conjecture that for every graph G with δ(G) ≥ 2, LIF(G) ≥ Σi=1n2di+1.