Spatial descriptive statistics: Difference between revisions

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[[Image:Biholomorphism illustration.svg|right|thumb|The complex [[exponential function]] mapping biholomorphically a rectangle to a quarter-[[annulus (mathematics)|annulus]].]]
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In the [[mathematics|mathematical theory]] of functions of [[complex analysis|one]] or [[several complex variables|more complex variables]], and also in [[complex algebraic geometry]], a '''biholomorphism''' or '''biholomorphic function''' is a [[bijective]] [[holomorphic function]] whose [[inverse function|inverse]] is also [[holomorphic function| holomorphic]].
 
Formally, a ''biholomorphic function'' is a function <math>\phi</math> defined on an [[open subset]] ''U'' of the <math>n</math>-dimensional complex space '''C'''<sup>''n''</sup> with values in '''C'''<sup>''n''</sup> which is [[holomorphic function| holomorphic]]  and [[injective function|one-to-one]], such that its [[image (mathematics)|image]] is an open set <math>V</math> in '''C'''<sup>''n''</sup> and the inverse <math>\phi^{-1}:V\to U</math> is also [[holomorphic function| holomorphic]]. More generally, ''U'' and ''V'' can be [[complex manifold]]s. By applying the chain rule, one may prove that it is enough for <math>\phi</math> to be holomorphic and one-to-one in order for it to be biholomorphic onto its image.
 
If there exists a biholomorphism <math>\phi \colon U \to V</math>, we say that ''U'' and ''V'' are '''biholomorphically equivalent''' or that they are '''biholomorphic'''.
 
If <math>n=1,</math> every [[simply connected]] open set other than the whole complex plane is biholomorphic to the [[unit disc]] (this is the [[Riemann mapping theorem]]). The situation is very different in higher dimensions. For example, open [[unit ball]]s and open unit [[polydisc]]s are not biholomorphically equivalent for <math>n>1.</math> In fact, there does not exist even a [[Proper map|proper]] holomorphic function from one to the other.
 
In the case of the complex plane '''C''', some authors (e.g. Freitag 2009, Definition IV.4.1) define [[conformal map]] as a synonym for ''biholomorphism''. The usual conditions for a function <math>\phi</math> to be conformal on '''C''' - namely, that <math>\phi</math> is holomorphic and that its derivative is nowhere zero - are equivalent to biholomorphism.
 
==References==
* {{cite book | author=Steven G. Krantz |  title=Function Theory of Several Complex Variables | publisher=American Mathematical Society | year=2002 | isbn= 0-8218-2724-3}}
* {{cite book | author=John P. D'Angelo |  title=Several Complex Variables and the Geometry of Real Hypersurfaces | publisher=CRC Press | year=1993 | isbn= 0-8493-8272-6}}
* {{cite book | author=Eberhard Freitag and Rolf Busam | title=Complex Analysis | publisher=Springer-Verlag | year=2009 | isbn= 978-3-540-93982-5}}
 
{{PlanetMath attribution|id=6032|title=biholomorphically equivalent}}
 
[[Category:Several complex variables]]
[[Category:Algebraic geometry]]
[[Category:Complex manifolds]]
[[Category:Functions and mappings]]

Latest revision as of 15:56, 16 August 2014

Nice to satisfy you, my title is Numbers Held though I don't really like becoming called like that. Bookkeeping is what I do. It's not a typical factor but what she likes performing is base jumping and now she is attempting to make cash with it. Years ago we moved to North Dakota.

my web blog :: at home std testing