Eigenvalues of zero-divisor graphs of finite commutative rings

Abstract

We investigate eigenvalues of the zero-divisor graph (R) of finite commutative rings R and study the interplay between these eigenvalues, the ring-theoretic properties of R and the graph-theoretic properties of (R). The graph (R) is defined as the graph with vertex set consisting of all non-zero zero-divisors of R and adjacent vertices x,y whenever xy = 0. We provide formulas for the nullity of (R), i.e. the multiplicity of the eigenvalue 0 of (R). Moreover, we precisely determine the spectra of ( Zp × Zp × Zp) and ( Zp × Zp × Zp × Zp) for a prime number p. We introduce a graph product × with the property that (R) (R1) × … × (Rr) whenever R R1 × … × Rr. With this product, we find relations between the number of vertices of the zero-divisor graph (R), the compressed zero-divisor graph, the structure of the ring R and the eigenvalues of (R).