quotient ring
Jump to navigation
Jump to search
English[edit]
Noun[edit]
quotient ring (plural quotient rings)
- (algebra, ring theory) For a given ring R and ideal I contained in R, another ring, denoted R / I, whose elements are the cosets of I in R.
- 1976, Kenneth Goodearl, Ring Theory: Nonsingular Rings and Modules, CRC Press, page 39:
- The third section covers a construct similar to the ring S°R — the maximal quotient ring, which exists for any ring. (When R is nonsingular, the maximal quotient ring is exactly S°R.) Finally, Section D provides an answer to the question of which right and left nonsingular rings have coinciding maximal right and left quotient rings.
- 2006, Peter A. Linnell, “Noncommutative localization in group rings”, in Andrew Ranicki, editor, Noncommutative Localization in Algebra and Topology, Cambridge University Press, page 42:
- On the other hand if already every element of R is either invertible or a zerodivisor, then R is its own classical quotient ring.
- 2012, Oleg A. Logachev, A. A. Salnikov, V. V. Yashchenko, translated by Svetla Nikova, Boolean Functions in Coding Theory and Cryptography, American Mathematical Society, page 10:
- 2. An ideal P of the ring R is prime if and only if the quotient ring R/P is a domain.
Synonyms[edit]
- (ring whose elements are the cosets of an ideal): difference ring, factor ring, residue class ring
Hyponyms[edit]
Derived terms[edit]
Translations[edit]
ring whose elements are the cosets of an ideal
|
See also[edit]
Further reading[edit]
- Quotient module on Wikipedia.Wikipedia
- Residue field on Wikipedia.Wikipedia