Showing total 2 results

1. OPTICAL ART OF A PLANAR IDEMPOTENT DIVISOR GRAPH OF COMMUTATIVE RING.

Author

AUTHMAN, MOHAMMED N., MOHAMMAD, HUSAM Q., and SHUKER, NAZAR H.

Subjects

COMMUTATIVE rings, DIVISOR theory, IDEMPOTENTS, GRAPH coloring, PLANAR graphs, MATHEMATICS

Abstract

The idempotent divisor graph of a commutative ring R is a graph with a vertex set in R* = R-{0}, where any distinct vertices x and y are adjacent if and only if x.y = e, for some non-unit idempotent element e^2 = e ∈ R, and is denoted by Л(R). Our goal in this work is to transform the planar idempotent divisor graph after coloring its regions into optical art by depending on the reflection of vertices, edges, and planes on the x or y-axes. That is, we achieve Op art solely through pure mathematics in this paper. [ABSTRACT FROM AUTHOR]

Published

2024

2. Some properties of generalized comaximal graph of commutative ring.

Author

Biswas, B. and Kar, S.

Subjects

*FINITE rings, *LOCAL rings (Algebra), *COMMUTATIVE rings, *UNDIRECTED graphs, *PLANAR graphs, *MATHEMATICS, *MATRIX rings, *HAMILTONIAN graph theory

Abstract

In this paper, we extend our investigation about the generalized comaximal graph introduced in Biswas et al. (Discrete Math Algorithms Appl 11(1):1950013, 2019a). The generalized comaximal graph is defined as follows: given a finite commutative ring R, the generalized comaximal graph G(R) is an undirected graph with its vertex set comprising elements of R and two distinct vertices u, v are adjacent if and only if there exists a non-zero idempotent e ∈ R such that u R + v R = e R . In this study, we focus on identifying the rings R for which the graph G(R) exhibits planarity. Moreover, we provide a characterization of the class of ring for which G(R) is toroidal, denoted by γ (G (R)) = 1 . Furthermore, we also evaluate the energy of the graph G(R). Finally, we demonstrate that the graph G(R) is always Hamiltonian for any finite commutative ring R. [ABSTRACT FROM AUTHOR]

Published

2024