The structure of modules over hereditary rings
AA Tuganbaev - Mathematical Notes, 2000 - Springer
Let A be a bounded hereditary Noetherian prime ring. For an A-module MA, we prove that M
is a finitely generated projective A\left/A r\left (M\right)\right.\kern-\nulldelimiterspace r\left …
is a finitely generated projective A\left/A r\left (M\right)\right.\kern-\nulldelimiterspace r\left …
[引用][C] The structure of modules over hereditary rings
AA Tuganbaev - Mathematical Notes, 2000 - elibrary.ru
The Structure of Modules over Hereditary Rings
AA Tuganbaev - Mathematical Notes, 2000 - infona.pl
Let A be a bounded hereditary Noetherian prime ring. For an A-module MA, we prove that M
is a finitely generated projective $${A\mathord {\left/{\vphantom {A {r\left …
is a finitely generated projective $${A\mathord {\left/{\vphantom {A {r\left …
The Structure of Modules over Hereditary Rings
A Tuganbaev - Matematicheskie Zametki, 2000 - mathnet.ru
AA Tuganbaev, “The Structure of Modules over Hereditary Rings”, Mat. Zametki, 68:5 (2000),
739–755; Math. Notes, 68:5 (2000), 627–639 Matematicheskie Zametki RUS ENG JOURNALS …
739–755; Math. Notes, 68:5 (2000), 627–639 Matematicheskie Zametki RUS ENG JOURNALS …
[PDF][PDF] The Structure of Modules over Hereditary Rings
AA Tuganbaev - Mathematical Notes, 2000 - researchgate.net
Let A be a bounded hereditary Noetherian prime ring. For an A-module MA, we prove that M
is a finitely generated projective A/r (M)-module if and only if M is a π-projective finite …
is a finitely generated projective A/r (M)-module if and only if M is a π-projective finite …
[PDF][PDF] The Structure of Modules over Hereditary Rings
AA Tuganbaev - Mathematical Notes, 2000 - researchgate.net
Let A be a bounded hereditary Noetherian prime ring. For an A-module MA, we prove that M
is a finitely generated projective A/r (M)-module if and only if M is a π-projective finite …
is a finitely generated projective A/r (M)-module if and only if M is a π-projective finite …
The Structure of Modules over Hereditary Rings
AA Tuganbaev - Matematicheskie Zametki, 2000 - mathnet.ru
AA Tuganbaev, “The Structure of Modules over Hereditary Rings”, Mat. Zametki, 68:5 (2000),
739–755; Math. Notes, 68:5 (2000), 627–639 Matematicheskie Zametki RUS ENG JOURNALS …
739–755; Math. Notes, 68:5 (2000), 627–639 Matematicheskie Zametki RUS ENG JOURNALS …