Total perfect codes in graphs realized by commutative rings

TL;DR

This paper investigates the existence and properties of total perfect codes in zero-divisor graphs of commutative rings with unity, providing characterizations and conditions for their existence.

Contribution

It characterizes when zero-divisor graphs of commutative rings admit total perfect codes and relates these codes to properties of the rings and their graphs.

Findings

Zero-divisor graph of a local ring admits a total perfect code iff it has degree one vertices.

Regular zero-divisor graphs imply the ring is reduced with an even number of non-zero zero-divisors.

Characterization of rings whose zero-divisor graphs admit total perfect codes.

Abstract

Let $R$ be a commutative ring with unity not equal to zero and let $\Gamma(R)$ be a zero-divisor graph realized by $R$. For a simple, undirected, connected graph $G = (V, E)$, a {\it total perfect code} denoted by $C(G)$ in $G$ is a subset $C(G) \subseteq V(G)$ such that $|N(v) \cap C(G)| = 1$ for all $v \in V(G)$, where $N(v)$ denotes the open neighbourhood of a vertex $v$ in $G$. In this paper, we study total perfect codes in graphs which are realized as zero-divisor graphs. We show a zero-divisor graph realized by a local commutative ring with unity admits a total perfect code if and only if the graph has degree one vertices. We also show that if $\Gamma(R)$ is a regular graph on $|Z^*(R)|$ vertices, then $R$ is a reduced ring and $|Z^*(R)| \equiv 0(mod ~2)$, where $Z^*(R)$ is a set of non-zero zero-divisors of $R$. We provide a characterization for all commutative rings with unity of which the realized zero-divisor graphs admit total perfect codes. Finally, we determine the cardinality of a total perfect code in $\Gamma(R)$ and discuss the significance of the study of total perfect codes in graphs realized by commutative rings with unity.