Vertex identifying codes for the n-dimensional lattice

Abstract

An r-identifying code on a graph G is a set C⊂ V(G) such that for every vertex in V(G), the intersection of the radius-r closed neighborhood with C is nonempty and different. Here, we provide an overview on codes for the n-dimensional lattice, discussing the case of 1-identifying codes, constructing a sparse code for the 4-dimensional lattice as well as showing that for fixed n, the minimum density of an r-identifying code is (1/rn-1).