Multiplication Ideals, Multiplication Rings, and the Ring R(X)
Canadian journal of mathematics, Tome 28 (1976) no. 4, pp. 760-768

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Let R be a commutative ring with an identity. An ideal A of R is called a multiplication ideal if for every ideal B⊆ A there exists an ideal C such that B = AC. A ring R is called a multiplication ring if all its ideals are multiplication ideals. A ring R is called an almost multiplication ring if RM is a multiplication ring for every maximal ideal M of R. Multiplication rings and almost multiplication rings have been extensively studied—for example, see [4; 8; 9; 11; 12; 15; and 16].
Anderson, D. D. Multiplication Ideals, Multiplication Rings, and the Ring R(X). Canadian journal of mathematics, Tome 28 (1976) no. 4, pp. 760-768. doi: 10.4153/CJM-1976-072-1
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