reduced ring
English
editNoun
editreduced ring (plural reduced rings)
- (algebra, ring theory) A ring R that has no nonzero nilpotent elements; equivalently, such that, for x ∈ R, x2 = 0 implies x = 0.
- 1997, Thomas G. Lucas, “Characterizing When R(X) is Completely Integrally Closed”, in Daniel Anderson, editor, Factorization in Integral Domains, Marcel Dekker, page 401:
- We do this for reduced rings in Corollary 10, and for rings with nonzero nilpotents in Corollary 15.
- 2004, Tsiu-Kwen Lee, Yiqiang Zhou, “Reduced Modules”, in Alberto Facchini, Evan Houston, Luigi Salce, editors, Rings, Modules, Algebras, and Abelian Groups, Marcel Dekker, page 365:
- Extending the notion of a reduced ring, we call a right module over a ring a reduced module if, for any and , implies . Various results of reduced rings are extended to reduced modules.
- 2005, David Eisenbud, The Geometry of Syzygies: A Second Course in Commutative Algebra and Algebraic Geometry, Springer, page 210:
- In general, the first case of importance is the normalization of a reduced ring R in its quotient ring K(R).
Related terms
editTranslations
editring that has no nonzero nilpotent elements
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