Cycle Domination, Independence and Irredundance in graphs

Abstract

A set S of vertices in a graph G = (V, E) is called cycle independent if the induced subgraph S is acyclic, and called odd-cycle indepdendet if S is bipartite. A set S is cycle dominating (resp. odd-cycle dominating) if for every vertex u ∈ V S there exists a vertex v ∈ S such that u and v are contained in a (resp. odd cycle) cycle in S \u\. A set S is cycle irredundant (resp. odd-cycle irredundant) if for every vertex v ∈ S there exists a vertex u ∈ V S such that u and v are in a (resp. odd cycle) cycle of S \u\, but u is not in a cycle of S \u\ \v\. In this paper we present these new concepts, which relate in a natural way to independence, domination and irredundance in graphs. In particular, we construct analogs to the domination inequality chain for these new concepts.