A Note on Induced Path Decomposition of Graphs

Abstract

Let G be a graph of order n. The path decomposition of G is a set of disjoint paths, say P, which cover all vertices of G. If all paths are induced paths in G, then we say P is an induced path decomposition of G. Moreover, if every path is of order at least 2, then we say G has an IPD. In this paper, we prove that every connected r-regular graph which is not complete graph of odd order admits an IPD. Also we show that every connected bipartite cubic graph of order n admits an IPD of size at most n3. We classify all connected claw-free graphs which admit an IPD.