On the cozero-divisor graphs associated to rings

Abstract: Let R be a ring with unity. The idempotent graph G Id (R) of a ring R is an undirected simple graph whose vertices are the set of all the elements of ring R and two vertices x and y are adjacent if and only if x + y is an idempotent element of R. In this paper, we obtain a necessary and sufficient condition on the ring R such that G Id (R) is planar. We prove that G Id (R) cannot be an outerplanar graph. Moreover, we classify all the finite non-local commutative rings R such that G Id (R) is a cograph, split g… Show more

“…The cozero-divisor graph of a ring R, denoted by Γ ′ (R), is an undirected simple graph whose vertices are the set of all non-zero and non-unit elements of R, and two distinct vertices x and y are adjacent if and only if x / ∈ Ry and y / ∈ Rx. In this article, we extend some of the results of [24] to an arbitrary ring. In this connection, we derive a closed-form formula of the Wiener index of the cozero-divisor graph of a finite commutative ring R. As applications, we compute the Wiener index of Γ ′ (R), when either R is the product of ring of integers modulo n or a reduced ring.…”

“…At the final part of this paper, we provide a SageMath code to compute the Wiener index of the cozero-divisor graph of these class of rings including the ring Zn of integers modulo n. et al [5] studied the cozero-divisor graph associated to the polynomial ring and the ring of power series. Some of the work associated with the cozero-divisor graphs of rings can be found in [3,4,7,11,23,24,25].Over the recent years, the Wiener index of certain graphs associated with rings have been studied by various authors. The Wiener index of the zero divisor graph of the ring Z n of integers modulo n has been studied in [10].…”

“…Recently, Selvakumar et al [28] calculated the Wiener index of the zero divisor graph for a finite commutative ring with unity. The Wiener index of the cozero-divisor graph of the ring Z n has been obtained in [24]. In order to extend the results of [24] to an arbitrary ring, we study the Wiener index of the cozero-divisor graph of a finite commutative 2020 Mathematics Subject Classification.…”

“…The Wiener index of the cozero-divisor graph of the ring Z n has been obtained in [24]. In order to extend the results of [24] to an arbitrary ring, we study the Wiener index of the cozero-divisor graph of a finite commutative 2020 Mathematics Subject Classification. 05C25, 05C50.…”

“…At the final part of this paper, we provide a SageMath code to compute the Wiener index of the cozero-divisor graph of these class of rings including the ring Zn of integers modulo n. et al [5] studied the cozero-divisor graph associated to the polynomial ring and the ring of power series. Some of the work associated with the cozero-divisor graphs of rings can be found in [3,4,7,11,23,24,25].…”

Wiener index of the Cozero-divisor graph of a finite commutative ring

“…The cozero-divisor graph of a ring R, denoted by Γ ′ (R), is an undirected simple graph whose vertices are the set of all non-zero and non-unit elements of R, and two distinct vertices x and y are adjacent if and only if x / ∈ Ry and y / ∈ Rx. In this article, we extend some of the results of [24] to an arbitrary ring. In this connection, we derive a closed-form formula of the Wiener index of the cozero-divisor graph of a finite commutative ring R. As applications, we compute the Wiener index of Γ ′ (R), when either R is the product of ring of integers modulo n or a reduced ring.…”

“…At the final part of this paper, we provide a SageMath code to compute the Wiener index of the cozero-divisor graph of these class of rings including the ring Zn of integers modulo n. et al [5] studied the cozero-divisor graph associated to the polynomial ring and the ring of power series. Some of the work associated with the cozero-divisor graphs of rings can be found in [3,4,7,11,23,24,25].Over the recent years, the Wiener index of certain graphs associated with rings have been studied by various authors. The Wiener index of the zero divisor graph of the ring Z n of integers modulo n has been studied in [10].…”

“…Recently, Selvakumar et al [28] calculated the Wiener index of the zero divisor graph for a finite commutative ring with unity. The Wiener index of the cozero-divisor graph of the ring Z n has been obtained in [24]. In order to extend the results of [24] to an arbitrary ring, we study the Wiener index of the cozero-divisor graph of a finite commutative 2020 Mathematics Subject Classification.…”

“…The Wiener index of the cozero-divisor graph of the ring Z n has been obtained in [24]. In order to extend the results of [24] to an arbitrary ring, we study the Wiener index of the cozero-divisor graph of a finite commutative 2020 Mathematics Subject Classification. 05C25, 05C50.…”

“…At the final part of this paper, we provide a SageMath code to compute the Wiener index of the cozero-divisor graph of these class of rings including the ring Zn of integers modulo n. et al [5] studied the cozero-divisor graph associated to the polynomial ring and the ring of power series. Some of the work associated with the cozero-divisor graphs of rings can be found in [3,4,7,11,23,24,25].…”

Wiener index of the Cozero-divisor graph of a finite commutative ring

Sombor Index and Sombor Spectrum of Cozero-Divisor Graph of $$\mathbb Z_n$$

Signless Laplacian spectrum of the cozero-divisor graph of the commutative ring ℤ_𝑛