Partitions and covers in convexity

Abstract

Given a graph G and a set S ⊂eq V(G), we say that S is -convex if the neighborhood of every vertex not in S is an independent set. A collection V = (V1, V2, … , Vp) of convex sets of G is a convex p-cover if V(G) = 1 ≤ i ≤ p Vi and Vi 1 ≤ j ≤ p, j i Vj for i ∈ \1, …, p\. If the convex sets of V are pairwise disjoint, V is a convex p-partition of V(G). The convex cover number φc(G) (the convex partition number c(G)) of a graph G is the least integer p ≥ 2 for which G has a convex p-cover (convex p-partition). In this work, we prove that the Convex p-cover and Convex p-Partition problems are -complete for any fixed p 4 in -convexity. Furthermore, for the three standard graph products, namely, the Cartesian, strong and lexicographic products, we determine these parameters for some cases and present bounds for others.