About: Valuation ring

Facets (new session)
Description
Metadata
Settings
- Rule:
- Inverse Functional Properties:
- "Same As":

About: Valuation ring Goto Sponge NotDistinct Permalink

An Entity of Type : owl:Thing, within Data Space : dbpedia.demo.openlinksw.com associated with source document(s)
QRcode icon

http://dbpedia.demo.openlinksw.com/describe/?url=http%3A%2F%2Fdbpedia.org%2Fresource%2FValuation_ring&invfp=IFP_OFF&sas=SAME_AS_OFF

In abstract algebra, a valuation ring is an integral domain D such that for every element x of its field of fractions F, at least one of x or x−1 belongs to D. Given a field F, if D is a subring of F such that either x or x−1 belongs toD for every nonzero x in F, then D is said to be a valuation ring for the field F or a place of F. Since F in this case is indeed the field of fractions of D, a valuation ring for a field is a valuation ring. Another way to characterize the valuation rings of a field F is that valuation rings D of F have F as their field of fractions, and their ideals are totally ordered by inclusion; or equivalently their principal ideals are totally ordered by inclusion. In particular, every valuation ring is a local ring.

Attributes	Values
rdfs:label	Valuační okruh (cs) Anello di valutazione (it) 값매김환 (ko) 付値環 (ja) Valuatiering (nl) Valuation ring (en) Кільце нормування (uk) 賦值環 (zh)
rdfs:comment	V oboru abstraktní algebry je valuační okruh takový obor integrity , že pro každý prvek jeho podílového tělesa platí buď nebo (cs) 抽象代数学において、付値環（ふちかん、英: valuation ring）とは、整域 D であって、その分数体 F のすべての元 x に対して、x か x −1 の少なくとも一方が D に属するようなものである。体 F が与えられたとき、D が F の部分環であって、F のすべての 0 でない元 x に対して x か x −1 が D に属しているとき、D を体 F の付値環（a valuation ring for the field F）または座 (place of F) という。この場合 F は確かに D の分数体であるので、体の付値環は付値環である。体 F の付値環を特徴づける別の方法は、F の付値環 D は F をその分数体としてもち、そのイデアルは包含関係で全順序づけられている、あるいは同じことだが、その単項イデアルが包含関係で全順序付けられていることである。とくに、すべての付値環は局所環である。体の付値環は支配（dominance）あるいは細分（refinement）によって順序を入れた体の局所部分環の集合の極大元である、ただしかつならば、はを支配する。体 K のすべての局所環は K のある付値環によって支配される。任意の素イデアルにおける局所化が付値環であるような整域はプリューファー整域と呼ばれる。 (ja) 추상대수학에서 값매김환(-環, 영어: valuation ring) 또는 부치환(賦値環)은 정수의 환의 국소화 와 유사한 성질을 가지는 정역이다. (ko) In de commutatieve algebra, een tak van de hogere wiskunde, is een valuatiering een bijzonder soort commutatieve ring met eenheidselement. (nl) 在抽象代數中，賦值環是一個域裡的一類特別子環，可由域上的某個賦值定義。離散賦值環是其中較容易操作的一類。 (zh) У комутативній алгебрі кільцем нормування називається область цілісності, що задовольняє деяким додатковим вимогам. Кільця нормування є пов'язаними з поняттям нормування на полі. Мають широке застосування в алгебраїчній теорії чисел і алгебраїчній геометрії. (uk) In abstract algebra, a valuation ring is an integral domain D such that for every element x of its field of fractions F, at least one of x or x−1 belongs to D. Given a field F, if D is a subring of F such that either x or x−1 belongs toD for every nonzero x in F, then D is said to be a valuation ring for the field F or a place of F. Since F in this case is indeed the field of fractions of D, a valuation ring for a field is a valuation ring. Another way to characterize the valuation rings of a field F is that valuation rings D of F have F as their field of fractions, and their ideals are totally ordered by inclusion; or equivalently their principal ideals are totally ordered by inclusion. In particular, every valuation ring is a local ring. (en) In algebra, un anello di valutazione (o dominio di valutazione) è un anello commutativo unitario integro A tale che, per ogni x nel suo campo dei quozienti, almeno uno tra e è in A; equivalentemente, è un anello commutativo integro i cui ideali sono totalmente ordinati. Esempi di anelli di valutazione sono le localizzazioni di e di (dove K è un campo) su un loro ideale primo, oppure l'anello degli interi p-adici per un numero primo p, o ancora l'anello delle serie formali su un campo. (it)
dcterms:subject	Ring theory Localization (mathematics) Commutative algebra Field (mathematics)
Wikipage page ID	966856 (xsd:integer)
Wikipage revision ID	1087452635 (xsd:integer)
Link from a Wikipage to another Wikipage	Prime ideal Principal ideal Principal ideal domain Meromorphic function Totally ordered group Algebraic closure Algebraically closed field Ultrametric Unit (ring theory) Valuation (algebra) Dedekind domain Integral domain Quotient ring Positive real numbers Prüfer domain Ring theory Complex plane Mathematische Zeitschrift Noetherian ring Serial module Subring Quotient group Ordered field Local ring homomorphism Empty set Hahn series Ideal (ring theory) Kernel (algebra) Krull dimension Place (mathematics) Maclaurin series Maximal ideal Totally ordered Divisibility (ring theory) Irreducible polynomial Local ring Algebraic Geometry (book) Algebraic geometry Algebraic variety American Mathematical Society Field (mathematics) P-adic integer P-adic number Cardinality Localization (mathematics) Discrete valuation ring Graduate Texts in Mathematics Regular local ring Regular point Ring (mathematics) Intersection (set theory) Taylor series Hyperreal number Prime number Abelian group Commutative algebra Field (mathematics) Absolute value (algebra) Abstract algebra Bijection Zorn's lemma Bézout domain Polynomial ring Field of fractions Group isomorphism Zero ideal If and only if Infinitesimal Integer Integral closure Miles Reid Real number Up to Field of fractions Partial order Residue field Subset Unit group

Faceted Search & Find service v1.17_git139 as of Feb 29 2024

Alternative Linked Data Documents: ODE Content Formats:

RDF

ODATA

Microdata

About

OpenLink Virtuoso version 08.03.3330 as of Mar 19 2024, on Linux (x86_64-generic-linux-glibc212), Single-Server Edition (378 GB total memory, 61 GB memory in use)
Data on this page belongs to its respective rights holders.
Virtuoso Faceted Browser Copyright © 2009-2024 OpenLink Software