Strongly prime rings
D Handelman, J Lawrence - Transactions of the American Mathematical …, 1975 - ams.org
A ring R is (right) strongly prime (SP) if every nonzero twosided ideal contains a finite set
whose right annihilator is zero. Examples are domains, prime Goldie rings and simple rings; …
whose right annihilator is zero. Examples are domains, prime Goldie rings and simple rings; …
[PDF][PDF] STRONGLY PRIME RINGS
D HANDELMAN, J LAWRENCE - AMERICAN MATHEMATICAL …, 1975 - researchgate.net
A ring R is (right) strongly prime (SP) if every nonzero twosided ideal contains a finite set
whose right annihilator is zero. Examples are domains, prime Goldie rings and simple rings; …
whose right annihilator is zero. Examples are domains, prime Goldie rings and simple rings; …
[PDF][PDF] STRONGLY PRIME RINGS
D HANDELMAN, J LAWRENCE - AMERICAN MATHEMATICAL …, 1975 - academia.edu
A ring R is (right) strongly prime (SP) if every nonzero twosided ideal contains a finite set
whose right annihilator is zero. Examples are domains, prime Goldie rings and simple rings; …
whose right annihilator is zero. Examples are domains, prime Goldie rings and simple rings; …
[PDF][PDF] STRONGLY PRIME RINGS
D HANDELMAN, J LAWRENCE - AMERICAN MATHEMATICAL …, 1975 - scholar.archive.org
A ring R is (right) strongly prime (SP) if every nonzero twosided ideal contains a finite set
whose right annihilator is zero. Examples are domains, prime Goldie rings and simple rings; …
whose right annihilator is zero. Examples are domains, prime Goldie rings and simple rings; …
Strongly Prime Rings
D Handelman, J Lawrence - Transactions of the American Mathematical …, 1975 - JSTOR
A ring R is (right) strongly prime (SP) if every nonzero two-sided ideal contains a finite set
whose right annihilator is zero. Examples are domains, prime Goldie rings and simple rings; …
whose right annihilator is zero. Examples are domains, prime Goldie rings and simple rings; …
[PDF][PDF] STRONGLY PRIME RINGS
D HANDELMAN, J LAWRENCE - AMERICAN MATHEMATICAL …, 1975 - academia.edu
A ring R is (right) strongly prime (SP) if every nonzero twosided ideal contains a finite set
whose right annihilator is zero. Examples are domains, prime Goldie rings and simple rings; …
whose right annihilator is zero. Examples are domains, prime Goldie rings and simple rings; …