Bond order: Difference between revisions

From formulasearchengine
Jump to navigation Jump to search
en>ZéroBot
m r2.7.1) (Robot: Adding ko:결합 차수
 
Dropped unmeaningful conjunction 'while' from second sentence.
Line 1: Line 1:
Myrtle Benny is how I'm known as and I really feel comfortable when people use the complete title. What  over the counter std test I love performing is to [http://Www.Youtube.com/watch?v=TLA6FAsXV9Q collect badges] but I've been using on new issues lately. Years in the past we moved to North Dakota. Since she was eighteen she's been operating as a meter  over  at home std testing the counter std test reader but she's usually wanted her [http://Www.Mydr.Com.au/sexual-health/herpes-your-questions-answered personal company].<br><br>Here is my site :: [http://luansantana.Trechosertanejo.com.br/members/gidgedavies/activity/67317/ std home test]
In [[mathematics]], '''Hilbert's syzygy theorem''' is a result of [[commutative algebra]], first proved by [[David Hilbert]] (1890) in connection with the [[Syzygy (mathematics)|syzygy]] (relation) problem of [[invariant theory]]. Roughly speaking, starting with relations between [[invariant polynomial|polynomial invariant]]s, then relations between the relations, and so on, it explains ''how far'' one has to go to reach a clarified situation. It is now considered to be an early result of [[homological algebra]], and through the [[depth (algebra)|depth]] concept, to be a measure of the [[non-singularity]] of [[affine space]].
 
== Formal statement ==
In modern language, the theorem may be stated as follows. Let ''k'' be a [[field (mathematics)|field]] and ''M'' a finitely generated [[module (mathematics)|module]] over the [[polynomial ring]]
 
:<math>k[x_1,\ldots,x_n].</math>
 
Hilbert's syzygy theorem then states that there exists a [[free resolution]] of ''M'' of length at most ''n''.
 
== See also ==
* [[Quillen–Suslin theorem]]
* [[Hilbert polynomial]]
 
== References ==
* [[David Eisenbud]], ''Commutative algebra. With a view toward algebraic geometry''. Graduate Texts in Mathematics, 150. Springer-Verlag, New York, 1995. xvi+785 pp. ISBN 0-387-94268-8; ISBN 0-387-94269-6 {{MathSciNet|id=1322960}}
* {{springer|title=Hilbert theorem|id=p/h047410}}
 
[[Category:Commutative algebra]]
[[Category:Homological algebra]]
[[Category:Invariant theory]]
[[Category:Theorems in abstract algebra]]

Revision as of 17:28, 7 December 2013

In mathematics, Hilbert's syzygy theorem is a result of commutative algebra, first proved by David Hilbert (1890) in connection with the syzygy (relation) problem of invariant theory. Roughly speaking, starting with relations between polynomial invariants, then relations between the relations, and so on, it explains how far one has to go to reach a clarified situation. It is now considered to be an early result of homological algebra, and through the depth concept, to be a measure of the non-singularity of affine space.

Formal statement

In modern language, the theorem may be stated as follows. Let k be a field and M a finitely generated module over the polynomial ring

k[x1,,xn].

Hilbert's syzygy theorem then states that there exists a free resolution of M of length at most n.

See also

References

  • David Eisenbud, Commutative algebra. With a view toward algebraic geometry. Graduate Texts in Mathematics, 150. Springer-Verlag, New York, 1995. xvi+785 pp. ISBN 0-387-94268-8; ISBN 0-387-94269-6 Template:MathSciNet
  • Other Sports Official Kull from Drumheller, has hobbies such as telescopes, property developers in singapore and crocheting. Identified some interesting places having spent 4 months at Saloum Delta.

    my web-site http://himerka.com/