The vertex leafage of chordal graphs

Abstract

Every chordal graph G can be represented as the intersection graph of a collection of subtrees of a host tree, a so-called tree model of G. The leafage (G) of a connected chordal graph G is the minimum number of leaves of the host tree of a tree model of G. The vertex leafage (G) is the smallest number k such that there exists a tree model of G in which every subtree has at most k leaves. The leafage is a polynomially computable parameter by the result of esa. In this contribution, we study the vertex leafage. We prove for every fixed k≥ 3 that deciding whether the vertex leafage of a given chordal graph is at most k is NP-complete by proving a stronger result, namely that the problem is NP-complete on split graphs with vertex leafage of at most k+1. On the other hand, for chordal graphs of leafage at most , we show that the vertex leafage can be calculated in time nO(). Finally, we prove that there exists a tree model that realizes both the leafage and the vertex leafage of G. Notably, for every path graph G, there exists a path model with (G) leaves in the host tree and it can be computed in O(n3) time.