In abstract algebra, a multiplicatively closed set (or multiplicative set) is a subsetS of a ringR such that the following two conditions hold:[1][2]
,
for all .
In other words, S is closed under taking finite products, including the empty product 1.[3] Equivalently, a multiplicative set is a submonoid of the multiplicative monoid of a ring.
Multiplicative sets are important especially in commutative algebra, where they are used to build localizations of commutative rings.
A subset S of a ring R is called saturated if it is closed under taking divisors: i.e., whenever a product xy is in S, the elements x and y are in S too.
An ideal P of a commutative ring R is prime if and only if its complement R \ P is multiplicatively closed.
A subset S is both saturated and multiplicatively closed if and only if S is the complement of a union of prime ideals.[4] In particular, the complement of a prime ideal is both saturated and multiplicatively closed.
The intersection of a family of multiplicative sets is a multiplicative set.
The intersection of a family of saturated sets is saturated.
multiplicatively, closed, abstract, algebra, multiplicatively, closed, multiplicative, subset, ring, such, that, following, conditions, hold, displaystyle, displaystyle, displaystyle, other, words, closed, under, taking, finite, products, including, empty, pro. In abstract algebra a multiplicatively closed set or multiplicative set is a subset S of a ring R such that the following two conditions hold 1 2 1 S displaystyle 1 in S x y S displaystyle xy in S for all x y S displaystyle x y in S In other words S is closed under taking finite products including the empty product 1 3 Equivalently a multiplicative set is a submonoid of the multiplicative monoid of a ring Multiplicative sets are important especially in commutative algebra where they are used to build localizations of commutative rings A subset S of a ring R is called saturated if it is closed under taking divisors i e whenever a product xy is in S the elements x and y are in S too Contents 1 Examples 2 Properties 3 See also 4 Notes 5 ReferencesExamples editExamples of multiplicative sets include the set theoretic complement of a prime ideal in a commutative ring the set 1 x x2 x3 where x is an element of a ring the set of units of a ring the set of non zero divisors in a ring 1 I for an ideal I the Jordan Polya numbers the multiplicative closure of the factorials Properties editAn ideal P of a commutative ring R is prime if and only if its complement R P is multiplicatively closed A subset S is both saturated and multiplicatively closed if and only if S is the complement of a union of prime ideals 4 In particular the complement of a prime ideal is both saturated and multiplicatively closed The intersection of a family of multiplicative sets is a multiplicative set The intersection of a family of saturated sets is saturated See also editLocalization of a ring Right denominator setNotes edit Atiyah and Macdonald p 36 Lang p 107 Eisenbud p 59 Kaplansky p 2 Theorem 2 References editM F Atiyah and I G Macdonald Introduction to commutative algebra Addison Wesley 1969 David Eisenbud Commutative algebra with a view toward algebraic geometry Springer 1995 Kaplansky Irving 1974 Commutative rings Revised ed University of Chicago Press MR 0345945 Serge Lang Algebra 3rd ed Springer 2002 nbsp This commutative algebra related article is a stub You can help Wikipedia by expanding it vte Retrieved from https en wikipedia org w index php title Multiplicatively closed set amp oldid 1220912940, wikipedia, wiki, book, books, library,
