[PDF][PDF] Primitively pure submodules and primitively divisible modules
AA Tuganbaev - Journal of Mathematical Sciences, 2002 - academia.edu
All rings are assumed to be associative and to have a nonzero identity element. Let A be a
ring, and let M be a right A-module. A proper ideal P of the ring A is said to be right primitive …
ring, and let M be a right A-module. A proper ideal P of the ring A is said to be right primitive …
[引用][C] Primitively pure submodules and primitively divisible modules
AA Tuganbaev - Journal of Mathematical Sciences, 2002 - elibrary.ru
[引用][C] Primitively pure submodules and primitively divisible modules
AA Tuganbaev - Journal of Mathematical Sciences, 2002 - infona.pl
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[PDF][PDF] PRIMITIVELY PURE SUBMODULES AND PRIMITIVELY DIVISIBLE MODULES
AA Tuganbaev - Journal of Mathematical Sciences, 2002 - researchgate.net
All rings are assumed to be associative and to have a nonzero identity element. Let A be a
ring, and let M be a right A-module. A proper ideal P of the ring A is said to be right primitive …
ring, and let M be a right A-module. A proper ideal P of the ring A is said to be right primitive …
[引用][C] Primitively pure submodules and primitively divisible modules
AA Tuganbaev - Journal of Mathematical Sciences, 2002 - Springer
All rings are assumed to be associative and to have a nonzero identity element. Let A be a
ring, and let M be a right A-module. A proper ideal P of the ring A is said to be right primitive …
ring, and let M be a right A-module. A proper ideal P of the ring A is said to be right primitive …