Isometric path partition: a new upper bound and a characterization of some extremal graphs

Abstract

An isometric path is a shortest path between two vertices. An isometric path partition (IPP) of a graph G is a set I of vertex-disjoint isometric paths in G that partition the vertices of G. The isometric path partition number of G, denoted by ipp(G), is the minimum cardinality of an IPP of G. In this article, we prove that every graph G satisfies ipp(G) ≤ |V(G)| - (G), where (G) is matching number of G. We further prove that a connected graph G is extremal with respect to this upper bound, i.e.\ satisfies ipp(G) = |V(G)| - (G), if and only if either (i) all blocks of G are odd complete graphs, or (ii) all blocks of G except one are odd complete graphs, and the unique block B of G that is not an odd complete graph is even and satisfy ipp(B) = |V(B)| - (B). As corollaries of this result, we obtain a full structural characterization of all connected odd graphs that are extremal with respect to our upper bound, as well as of all extremal block graphs.