Identifying codes and locating-dominating sets on paths and cycles

Abstract

Let G=(V,E) be a graph and let r 1 be an integer. For a set D ⊂eq V, define Nr[x] = \y ∈ V: d(x, y) ≤ r\ and Dr(x) = Nr[x] D, where d(x,y) denotes the number of edges in any shortest path between x and y. D is known as an r-identifying code (r-locating-dominating set, respectively), if for all vertices x∈ V (x ∈ V D, respectively), Dr(x) are all nonempty and different. In this paper, we provide complete results for r-identifying codes in paths and odd cycles; we also give complete results for 2-locating-dominating sets in cycles.