Convex geometries over induced paths with bounded length

Abstract

Graph convexity spaces have been studied in many contexts. In particular, some studies are devoted to determine if a graph equipped with a convexity space is a convex geometry. It is well known that chordal and Ptolemaic graphs can be characterized as convex geometries with respect to the geodesic and monophonic convexities, respectively. Weak polarizable graphs, interval graphs, and proper interval graphs can also be characterized in this way. In this paper we introduce the notion of lk-convexity, a natural restriction of the monophonic convexity. Let G be a graph and k≥ 2 an integer. A subset S⊂eq V(G) is lk-convex if and only if for any pair of vertices x,y of S, each induced path of length at most k connecting x and y is completely contained in the subgraph induced by S. The lk-convexity consists of all lk-convex subsets of G. In this work, we characterize lk-convex geometries (graphs that are convex geometries with respect to the lk-convexity) for k∈\2,3\. We show that a graph G is an l2-convex geometry if and only if G is a chordal P4-free graph, and an l3-convex geometry if and only if G is a chordal graph with diameter at most three such that its induced gems satisfy a special "solving" property. As far as the authors know, the class of l3-convex geometries is the first example of a non-hereditary class of convex geometries.