Fault-tolerant Locating-Dominating Sets on the Infinite King Grid

Abstract

Let G be a graph of a network system with vertices, V(G), representing physical locations and edges, E(G), representing informational connectivity. A locating-dominating (LD) set S ⊂eq V(G) is a subset of vertices representing detectors capable of sensing an "intruder" at precisely their location or somewhere in their open-neighborhood -- an LD set must be capable of locating an intruder anywhere in the graph. We explore three types of fault-tolerant LD sets: redundant LD sets, which allow a detector to be removed, error-detecting LD sets, which allow at most one false negative, and error-correcting LD sets, which allow at most one error (false positive or negative). In particular, we determine lower and upper bounds for the minimum density of these three fault-tolerant locating-dominating sets in the infinite king grid.