Classification of Genus Three Zero-Divisor Graphs
In this paper, we consider the problem of classifying commutative rings according to the genus number of its associating zero-divisor graphs. The zero-divisor graph of <i>R</i>, where <i>R</i> is a commutative ring with nonzero identity, denoted by <inline-formula><m...
Main Authors: | Thangaraj Asir, Karuppiah Mano, Turki Alsuraiheed |
---|---|
Format: | Article |
Language: | English |
Published: |
MDPI AG
2023-12-01
|
Series: | Symmetry |
Subjects: | |
Online Access: | https://www.mdpi.com/2073-8994/15/12/2167 |
Similar Items
-
On Global Offensive Alliance in Zero-Divisor Graphs
by: Raúl Juárez Morales, et al.
Published: (2022-01-01) -
Exploring the structure and properties of ideal-based zero-divisor graphs in involution near rings
by: Masreshaw Walle Abate, et al.
Published: (2024-03-01) -
The wiener index of the zero-divisor graph for a new class of residue class rings
by: Yinhu Wei, et al.
Published: (2022-09-01) -
Brief survey on divisor graphs and divisor function graphs
by: Vignesh Ravi, et al.
Published: (2023-05-01) -
Vertex and region colorings of planar idempotent divisor graphs of commutative rings.
by: Mohammed Authman, et al.
Published: (2022-01-01)