Sombor index and eigenvalues of weakly zero-divisor graph of commutative rings

Abstract

The weakly zero-divisor graph W(R) of a commutative ring R is the simple undirected graph whose vertices are nonzero zero-divisors of R and two distinct vertices x, y are adjacent if and only if there exist w∈ ann(x) and z∈ ann(y) such that wz =0. In this paper, we determine the Sombor index for the weakly zero-divisor graph of the integers modulo ring Zn. Furthermore, we investigate the Sombor spectrum and establish bounds for the Sombor energy of the weakly zero-divisor graph of Zn.

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