On p-injective rings
Glasgow mathematical journal, Tome 37 (1995) no. 3, pp. 373-378

Voir la notice de l'article provenant de la source Cambridge University Press

Throughout this paper R will be an associative ring with unity and all R-modules are unitary. The right (resp. left) annihilator in R of a subset X of a module is denoted by r(X)(resp. I(X)). The Jacobson radical of R is denoted by J(R), the singular ideals are denoted by Z(RR) and Z(RR) and the socles by Soc(RR) and Soc(RR). For a module M, E(M) and PE(M) denote the injective and pure-injective envelopes of M, respectively. For a submodule A ⊆ M, the notation A ⊆⊕M will mean that A is a direct summand of M.
Puninski, Gennadi; Wisbauer, Robert; Yousif, Mohamed. On p-injective rings. Glasgow mathematical journal, Tome 37 (1995) no. 3, pp. 373-378. doi: 10.1017/S0017089500031657
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