Carath\'eodory Number in Cycle Convexity

Abstract

Let G be a graph and S ⊂eq V(G). In the cycle convexity, we say that S is cycle convex if for any u∈ V(G) S, the induced subgraph of S\u\ contains no cycle that includes u. The cycle convex hull of S, denoted by (S), is the smallest cycle convex set containing S. A set S ⊂eq V(G) is said to be Carath\'eodory independent if there exists a vertex u ∈ (S) such that u a ∈ S (S \a\) , and the Carath\'eodory number (G) is the maximum size of such a set. In this paper, we prove that given a graph G and k ∈ N, deciding whether (G) ≥ k is -complete, even when G is bipartite. On the other hand, we derive exact values and constant upper bounds for several graph classes, leading to polynomial-time algorithms. Some of them include forests, cycles, complete graphs, complete multipartite, split, and P4-sparse graphs. In addition, we present a characterization of n-vertex graphs G with extremal values near to n, including (G) = n-1 and (G) = n-2. Furthermore, we investigate the behavior of the Carath\'eodory number under graph products such as the strong, lexicographic, and Cartesian products.