Perfect codes in Cayley sum graphs

Abstract

A subset C of the vertex set of a graph is called a perfect code of if every vertex of is at distance no more than one to exactly one vertex in C. Let A be a finite abelian group and T a square-free subset of A. The Cayley sum graph of A with respect to the connection set T is a simple graph with A as its vertex set, and two vertices x and y are adjacent whenever x+y∈ T. A subgroup of A is said to be a subgroup perfect code of A if the subgroup is a perfect code of some Cayley sum graph of A. In this paper, we give some necessary and sufficient conditions for a subset of A to be a perfect code of a given Cayley sum graph of A. We also characterize all subgroup perfect codes of A.