Induced path factors of regular graphs

Abstract

An induced path factor of a graph G is a set of induced paths in G with the property that every vertex of G is in exactly one of the paths. The induced path number (G) of G is the minimum number of paths in an induced path factor of G. We show that if G is a connected cubic graph on n>6 vertices, then (G)(n-1)/3. Fix an integer k3. For each n, define Mn to be the maximum value of (G) over all connected k-regular graphs G on n vertices. As n→∞ with nk even, we show that ck=(Mn/n) exists. We prove that 5/18 c31/3 and 3/7 c41/2 and that ck=12-O(k-1) for k→∞.