Computing the Exchange Number in Graphs with respect to Cycle Convexity

Abstract

Given a graph G, a subset S ⊂eq V(G) is cycle convex, if for any vertex v ∈ V(G) S, the induced subgraph, G[S \v\] cannot form a cycle containing the vertex v. The exchange number of G, denoted by ecc(G) is the maximum cardinality of an E-independent set of G. This paper studies the computational complexity of determining the exchange number of graphs and provides exact values for some graph classes. Given a graph G and a positive integer k, we show that deciding whether ecc(G) ≥ k is NP-complete even if G is a K5-free graph. In contrast, we characterize all n-vertex graphs G with exchange number n-1 and obtain closed formulas for chordal graphs G whose blocks lie in a single chain, which leads to polynomial-time algorithms for computing ecc(G). We also establish a lower bound for the exchange number of the Cartesian product of general graphs and by using the results of Anand et al. bijo2, we derive an explicit formula for the exchange number of strong and lexicographic graph products.