As a generalization of power series rings, Ribenboim introduced the notion of the rings of generalized power series. Let R be a commutative ring, and (S.≤) a strictly totally ordered monoid. We prove that (1) the...As a generalization of power series rings, Ribenboim introduced the notion of the rings of generalized power series. Let R be a commutative ring, and (S.≤) a strictly totally ordered monoid. We prove that (1) the ring [[R<sup>(</sup>S.≤]] of generalized power series is a PP-ring if and only if R is a PP-ring and every S-indexed subset C of B(R) (the set of all idempotents of R) has a least upper bound in B(R). and (2) if (S. ≤) also satisfies the condition that 0≤s for any s∈S, then the ring [[R<sup>(</sup>S.≤]] is weakly PP if and only if R is weakly PP.展开更多
Let R be an abelian ring. We consider a special subring An, relative to α2,…, αn∈ REnd(R), of the matrix ring Mn(R) over a ring R. It is shown that the ring An is a generalized right PP-ring (right zip ring)...Let R be an abelian ring. We consider a special subring An, relative to α2,…, αn∈ REnd(R), of the matrix ring Mn(R) over a ring R. It is shown that the ring An is a generalized right PP-ring (right zip ring) if and only if the ring R is a generalized right PP-ring (right zip ring). Our results yield more examples of generalized right PP-rings and right ziu rings.展开更多
In this paper the sufficient and necessary conditions are given for a formal triangular matrix ring to be right PP, generalized right PP, or semihereditary, respectively.
The purpose of this paper is to study the following two questions on AP-injective rings: (1) R is a regular ring if and only if R is a left PP-ring and R is left AP-injective; (2) Let R be a right .AP-injective ring. ...The purpose of this paper is to study the following two questions on AP-injective rings: (1) R is a regular ring if and only if R is a left PP-ring and R is left AP-injective; (2) Let R be a right .AP-injective ring. Then R is self-injective if and only if R is weakly injective. Hence we get some new results of P-injective rings.展开更多
基金Research supported by National Natural Science Foundation of China. 19501007Natural Science Foundation of Gansu. ZQ-96-01
文摘As a generalization of power series rings, Ribenboim introduced the notion of the rings of generalized power series. Let R be a commutative ring, and (S.≤) a strictly totally ordered monoid. We prove that (1) the ring [[R<sup>(</sup>S.≤]] of generalized power series is a PP-ring if and only if R is a PP-ring and every S-indexed subset C of B(R) (the set of all idempotents of R) has a least upper bound in B(R). and (2) if (S. ≤) also satisfies the condition that 0≤s for any s∈S, then the ring [[R<sup>(</sup>S.≤]] is weakly PP if and only if R is weakly PP.
基金The NSF (10961021) of ChinaTRAPOYT and NWNU-KJCXGC212
文摘Let R be an abelian ring. We consider a special subring An, relative to α2,…, αn∈ REnd(R), of the matrix ring Mn(R) over a ring R. It is shown that the ring An is a generalized right PP-ring (right zip ring) if and only if the ring R is a generalized right PP-ring (right zip ring). Our results yield more examples of generalized right PP-rings and right ziu rings.
基金Partially supported by the Fund (KM200610005024) of Beijing Education Committeethe NNSF (10671061) of China.
文摘In this paper the sufficient and necessary conditions are given for a formal triangular matrix ring to be right PP, generalized right PP, or semihereditary, respectively.
基金Supported by the NNSF of China(10071035)the Foundation of the Education Committee of Anhui Province(2003kj166).
文摘The purpose of this paper is to study the following two questions on AP-injective rings: (1) R is a regular ring if and only if R is a left PP-ring and R is left AP-injective; (2) Let R be a right .AP-injective ring. Then R is self-injective if and only if R is weakly injective. Hence we get some new results of P-injective rings.
