Analytic variety

From Wikipedia, the free encyclopedia

In mathematics, specifically geometry, an analytic variety is defined locally as the set of common solutions of several equations involving analytic functions. It is analogous to the included concept of complex algebraic variety, and any complex manifold is an analytic variety. Since algebraic varieties may have singular points, not all analytic varieties are complex manifolds. An Analytic variety is also called real or complex analytic set.

[edit] References

• Chirka, Evgeniǐ Mikhaǐlovich (1989), Complex analytic sets, Mathematics and Its Application (Soviet Series), 46, Dordrecht-Boston-London: Kluwer Academic Publishers, Zbl 0683.32002, ISBN 0-7923-0234-6, http://books.google.it/books?id=1vCaY1D9vPEC&printsec=frontcover&dq=Complex+analytic+sets#PPP1,M1 . See chapter 1, paragraph 2 Definition and simplest properties of analytic sets. Sets of codimension 1.
• Whitney, Hassler (1972), Complex analytic varieties, Addison-Wesley Series in Mathematics, Reading-Menlo Park-London-Don Mills: Addison-Wesley, Zbl 0265.32008, ISBN 0-2010-8653-0 . See chapter 2, Analytic varieties.

[edit] External links

• Analytic set on PlanetMath.
• Chirka, Evgeniǐ Mikhaǐlovich (2001), "Analytic set", in Hazewinkel, Michiel, Encyclopaedia of Mathematics, Kluwer Academic Publishers, ISBN 978-1556080104 .