Laplacian eigenvalues of the zero divisor graph of the ring Zn

Abstract

We study the Laplacian eigenvalues of the zero divisor graph (Zn) of the ring Zn and prove that (Zpt) is Laplacian integral for every prime p and positive integer t≥ 2. We also prove that the Laplacian spectral radius and the algebraic connectivity of (Zn) for most of the values of n are, respectively, the largest and the second smallest eigenvalues of the vertex weighted Laplacian matrix of a graph which is defined on the set of proper divisors of n. The values of n for which algebraic connectivity and vertex connectivity of (Zn) coincide are also characterized.