Rational mapping: Difference between revisions

Latest revision as of 22:11, 25 September 2014

Hi there, I am Andrew Berryhill. To play lacross is the thing I adore most of all. Distributing production is exactly where my main earnings arrives from and it's something I truly free tarot readings; kpupf.com, appreciate. I've always cherished residing in Kentucky but now I'm considering other options.

Feel free to visit my weblog ... free psychic readings - click this link here now - online reader - Click On this page,

@@ Line 1: / Line 1: @@
-In [[algebraic geometry]], a '''noetherian scheme''' is a [[scheme (mathematics)|scheme]] that admits a finite covering by open affine subsets <math>\operatorname{Spec} A_i</math>, <math>A_i</math> [[noetherian rings]]. More generally, a scheme is '''locally noetherian''' if it is covered by spectra of noetherian rings. Thus, a scheme is noetherian if and only if it is locally noetherian and quasi-compact.  As with noetherian rings, the concept is named after [[Emmy Noether]].
+Hi there, I am Andrew Berryhill. To play lacross is the thing I adore most of all. Distributing production is exactly where my main earnings arrives from and it's something I truly  free tarot readings; [http://kpupf.com/xe/talk/735373 kpupf.com], appreciate. I've always cherished residing in Kentucky but now I'm considering other options.<br><br>Feel free to visit my weblog ...  free psychic readings - [http://cartoonkorea.com/ce002/1093612 click this link here now] - online reader - [http://www.herandkingscounty.com/content/information-and-facts-you-must-know-about-hobbies Click On this page],
-It can be shown that, in a locally noetherian scheme, if&nbsp; <math>\operatorname{Spec} A</math> is an open affine subset, then ''A'' is a noetherian ring. In particular, <math>\operatorname{Spec} A</math> is a noetherian scheme if and only if ''A'' is a noetherian ring. Let ''X'' be a locally noetherian scheme. Then the local rings <math>\mathcal{O}_{X, x}</math> are noetherian rings.
-A noetherian scheme is a [[noetherian topological space]]. But the converse is false in general; consider, for example, the spectrum of a non-noetherian valuation ring.
-The definitions extend to [[formal scheme]]s.
-== References ==
-* [[Robin Hartshorne]], ''Algebraic geometry''.
-{{geometry-stub}}
-[[Category:Algebraic geometry]]

Rational mapping: Difference between revisions

Latest revision as of 22:11, 25 September 2014

Navigation menu

Search