Add to ORKGIn (n,d)-ring and n-coherent ring theory, n-presented modules plays an important role. In this paper, we firstly give some new characterizations of n-presented modules and n-coherent rings. Then, we introduce the concept of (n,0)-projective dimension, which measures how far away a finitely generated module is from being n-presented and how far away a ring is from being Noetherian, for modules and rings. This dimension has nice properties when the ring in question is n-coherent. Some known results are extended or obtained as corollaries
Let R be a ring, τ=T,ℱ a hereditary torsion theory of mod-R, and n a positive integer. Then, R is ca...
The paper is concerned with the study of the decisive dimension defined on the category of left modu...
Abstract. The concept of Gorenstein dimension, defined by Auslander and Bridger for finitely generat...
We define the presented dimensions for modules and rings to measure how far away a module is from ha...
Abstract. R is called a right Π-coherent ring in case every finitely gen-erated torsionless right R-...
Abstract. In this paper, we introduce a new generalization of coherent rings using the Gorenstein pr...
Abstract. Let R be a ring, and let n; d be non-negative integers. A right R-moduleM is called (n; d)...
Let R be a ring, n a fixed nonnegative integer. The concepts of (n, 0)-FI-injective and (n, 0)-FI-fl...
Let R be a ring, n a fixed nonnegative integer. The concepts of (n; 0)-FI-injective and (n; 0)-FI-fl...
summary:It is known that a ring $R$ is left Noetherian if and only if every left $R$-module has an i...
AbstractIt is shown that the G-dimension and the complete intersection dimension are relative projec...
This dissertation presents a homological dimension notion of Cohen-Macaulay for non-Noetherian rings...
This dissertation presents a homological dimension notion of Cohen-Macaulay for non-Noetherian rings...
In Chapter 1, projective resolutions of modules over a ring R are constructed starting from appropri...
Homological techniques provide potent tools in commutative algebra. For example, successive approxim...
Let R be a ring, τ=T,ℱ a hereditary torsion theory of mod-R, and n a positive integer. Then, R is ca...
The paper is concerned with the study of the decisive dimension defined on the category of left modu...
Abstract. The concept of Gorenstein dimension, defined by Auslander and Bridger for finitely generat...
We define the presented dimensions for modules and rings to measure how far away a module is from ha...
Abstract. R is called a right Π-coherent ring in case every finitely gen-erated torsionless right R-...
Abstract. In this paper, we introduce a new generalization of coherent rings using the Gorenstein pr...
Abstract. Let R be a ring, and let n; d be non-negative integers. A right R-moduleM is called (n; d)...
Let R be a ring, n a fixed nonnegative integer. The concepts of (n, 0)-FI-injective and (n, 0)-FI-fl...
Let R be a ring, n a fixed nonnegative integer. The concepts of (n; 0)-FI-injective and (n; 0)-FI-fl...
summary:It is known that a ring $R$ is left Noetherian if and only if every left $R$-module has an i...
AbstractIt is shown that the G-dimension and the complete intersection dimension are relative projec...
This dissertation presents a homological dimension notion of Cohen-Macaulay for non-Noetherian rings...
This dissertation presents a homological dimension notion of Cohen-Macaulay for non-Noetherian rings...
In Chapter 1, projective resolutions of modules over a ring R are constructed starting from appropri...
Homological techniques provide potent tools in commutative algebra. For example, successive approxim...
Let R be a ring, τ=T,ℱ a hereditary torsion theory of mod-R, and n a positive integer. Then, R is ca...
The paper is concerned with the study of the decisive dimension defined on the category of left modu...
Abstract. The concept of Gorenstein dimension, defined by Auslander and Bridger for finitely generat...