Add to ORKGIn this paper, we investigate some properties of SIP, SSP and CS-Rickart modules. We give equivalent conditions for SIP and SSP modules; establish connections between the class of semisimple artinian rings and the class of SIP rings. It shows that R is a semisimple artinian ring if and only if RR is SIP and every right R-module has a SIP-cover. We also prove that R is a semiregular ring and J(R) = Z(RR) if only if every finitely generated projective module is a CSRickart module which is also a C2 module
© World Scientific Publishing Company.We study A-Ci modules (i = 2, 3), first introduced in [K. Oshi...
© World Scientific Publishing Company.We study A-Ci modules (i = 2, 3), first introduced in [K. Oshi...
© 2015 Springer Science+Business Media New York This paper contains new characterizations of SSPm. o...
© 2017, Pleiades Publishing, Ltd.In this paper, we investigate some properties of SIP, SSP and CS-Ri...
© 2017, Pleiades Publishing, Ltd.In this paper, we investigate some properties of SIP, SSP and CS-Ri...
© 2017, Pleiades Publishing, Ltd.In this paper, we investigate some properties of SIP, SSP and CS-Ri...
In this paper, we investigate some properties of SIP, SSP and CS-Rickart modules. We give equivalent...
In this paper, we investigate some properties ofSIP, SSP and CS-Rickart modules. We give equivalent ...
AbstractA module M is called a CS-module if every submodule of M is essential in a direct summand of...
R will be a ring with identity and modules M will be unital right R−modules. In this paper, properti...
R will be an associative ring with identity and modules M will be unital left R−modules. In this wor...
summary:A ring $R$ has right SIP (SSP) if the intersection (sum) of two direct summands of $R$ is a...
summary:A ring $R$ has right SIP (SSP) if the intersection (sum) of two direct summands of $R$ is a...
© World Scientific Publishing Company.We study A-Ci modules (i = 2, 3), first introduced in [K. Oshi...
© 2015 Springer Science+Business Media New York This paper contains new characterizations of SSPm. o...
© World Scientific Publishing Company.We study A-Ci modules (i = 2, 3), first introduced in [K. Oshi...
© World Scientific Publishing Company.We study A-Ci modules (i = 2, 3), first introduced in [K. Oshi...
© 2015 Springer Science+Business Media New York This paper contains new characterizations of SSPm. o...
© 2017, Pleiades Publishing, Ltd.In this paper, we investigate some properties of SIP, SSP and CS-Ri...
© 2017, Pleiades Publishing, Ltd.In this paper, we investigate some properties of SIP, SSP and CS-Ri...
© 2017, Pleiades Publishing, Ltd.In this paper, we investigate some properties of SIP, SSP and CS-Ri...
In this paper, we investigate some properties of SIP, SSP and CS-Rickart modules. We give equivalent...
In this paper, we investigate some properties ofSIP, SSP and CS-Rickart modules. We give equivalent ...
AbstractA module M is called a CS-module if every submodule of M is essential in a direct summand of...
R will be a ring with identity and modules M will be unital right R−modules. In this paper, properti...
R will be an associative ring with identity and modules M will be unital left R−modules. In this wor...
summary:A ring $R$ has right SIP (SSP) if the intersection (sum) of two direct summands of $R$ is a...
summary:A ring $R$ has right SIP (SSP) if the intersection (sum) of two direct summands of $R$ is a...
© World Scientific Publishing Company.We study A-Ci modules (i = 2, 3), first introduced in [K. Oshi...
© 2015 Springer Science+Business Media New York This paper contains new characterizations of SSPm. o...
© World Scientific Publishing Company.We study A-Ci modules (i = 2, 3), first introduced in [K. Oshi...
© World Scientific Publishing Company.We study A-Ci modules (i = 2, 3), first introduced in [K. Oshi...
© 2015 Springer Science+Business Media New York This paper contains new characterizations of SSPm. o...