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In [[mathematics]], '''complex geometry''' is the study of [[complex manifold]]s and functions of many [[complex variable]]s. Application of transcendental methods to [[algebraic geometry]] falls in this category, together with more geometric chapters of [[complex analysis]].
 
Throughout this article, "[[Analytic function|analytic]]" is often dropped for simplicity; for instance, subvarieties or hypersurfaces refer to analytic ones. Following the convention in Wikipedia, varieties are assumed to be irreducible.
 
== Definitions ==
An ''[[Analytic variety|analytic subset]]'' of a complex-analytic manifold ''M'' is locally the zero-locus of some family of holomorphic functions on ''M''. It is called an analytic subvariety if it is irreducible in the Zariski topology.
 
== Line bundles and divisors ==
Throughout this section, ''X'' denotes a complex manifold.
 
Let <math>\operatorname{Pic}(X)</math> be the set of all isomorphism classes of line bundles on ''X''. It is called the [[Picard group]] of ''X'' and is naturally isomorphic to <math>H^1(X, \mathcal{O}^*)</math>. Taking the short exact sequence of
:<math>0 \to \mathbb{Z} \to \mathcal{O} \to  \mathcal{O}^* \to 0</math>
where the second map is <math>f \mapsto \exp (2\pi i f)</math>
yields a homomorphism of groups:
:<math>\operatorname{Pic}(X) \to H^2(X, \mathbb{Z}).</math>
The image of a line bundle <math>\mathcal{L}</math> under this map is denoted by <math>c_1(\mathcal{L})</math> and is called the first [[Chern class]] of <math>\mathcal{L}</math>.
 
A [[divisor (algebraic geometry)|divisor]] ''D'' on ''X'' is a [[formal sum]] of hypersurfaces (subvariety of codimension one):
:<math>D = \sum a_i V_i, \quad a_i \in \mathbb{Z}</math>
that is locally a finite sum.<ref>This last condition is automatic for a noetherian scheme or a compact complex manifold.</ref> The set of all divisors on ''X'' is denoted by <math>\operatorname{Div}(X)</math>. It can be canonically identified with <math>H^0(X, \mathcal{M}^*/\mathcal{O}^*)</math>. Taking the long exact sequence of the quotient <math>\mathcal{M}^*/\mathcal{O}^*</math>, one obtains a homomorphism:
:<math>\operatorname{Div}(X) \to \operatorname{Pic}(X).</math>
 
A line bundle is said to be [[positive line bundle|positive]] if its first Chern class is represented by a closed positive real <math>(1,1)</math>-form. Equivalently, a line bundle is positive if it admits a hermitian structure such that the induced connection has [[Griffiths-positive]] curvature. A complex manifold admitting a positive line bundle is kähler.
 
The [[Kodaira embedding theorem]] states that a line bundle on a compact kähler manifold is positive if and only if it is [[ample line bundle|ample]].
 
==Complex vector bundles==
Let ''X'' be a differentiable manifold. The basic invariant of a complex vector bundle <math>\pi: E \to X</math> is the [[Chern class]] of the bundle. By definition, it is a sequence <math>c_1, c_2, \dots</math> such that <math>c_i(E)</math> is an element of <math>H^{2i}(X, \mathbb{Z})</math> and that satisfies the following axioms:<ref>{{harvnb|Kobayashi–Nomizu|1996|Ch XII}}</ref>
# <math>c_i(f^*(E)) = f^*(c_i(E))</math> for any differentiable map <math>f: Z \to X</math>.
# <math>c(E \oplus F) = c(E) \cup c(F)</math> where ''F'' is another bundle and <math>c = 1 + c_1 + c_2 + \dots.</math>
# <math>c_i(E) = 0</math> for <math>i > \operatorname{rk}E</math>.
# <math>-c_1(E_1)</math> generates <math>H^2(\mathbb{C}\mathbf{P}^1, \mathbb{Z})</math> where <math>E_1</math> is the [[canonical line bundle]] over <math>\mathbb{C}\mathbf{P}^1</math>.
 
If ''L'' is a line bundle, then the [[Chern character]] of ''L'' is given by
:<math>\operatorname{ch}(L) = e^{c_1(L)}</math>.
More generally, if ''E'' is a vector bundle of rank ''r'', then we have the formal factorization:
<math>\sum c_i(E)t^i = \prod_1^r (1+ \eta_i t)</math> and then we set
:<math>\operatorname{ch}(E) = \sum e^{\eta_i}</math>.
 
== Methods from harmonic analysis ==
Some deep results in complex geometry are obtained with the aid of harmonic analysis.
 
== Vanishing theorem ==
There are several versions of vanishing theorems in complex geometry for both compact and non-compact complex manifolds. They are however all based on the [[Bochner method]].
 
==See also==
* [[Bivector (complex)]]
* [[Deformation Theory#Deformations of complex manifolds]]
* [[Complex analytic space]]
* [[GAGA]]
* [[Several complex variables]]
* [[Complex projective space]]
* [[List of complex and algebraic surfaces]]
* [[Enriques–Kodaira classification]]
* [[Kähler manifold]]
* [[Stein manifold]]
* [[Pseudoconvexity]]
* [[Kobayashi metric]]
* [[Projective variety]]
* [[Cousin problems]]
* [[Cartan's theorems A and B]]
* [[Hartogs' extension theorem]]
* [[Calabi–Yau manifold]]
* [[Reflection symmetry|Mirror symmetry]]
* [[Hermitian symmetric space]]
* [[Complex Lie group]]
* [[Hopf manifold]]
* [[Hodge decomposition]]
* [[Kobayashi-Hitchin correspondence]]
* [[Holomorphic Higgs pairs]]
 
==References==
{{Reflist}}
 
*{{cite book |title=Complex Geometry: An Introduction|first=Daniel|last=Huybrechts
|publisher=Springer|year=2005|isbn=3-540-21290-6}}
* {{Citation | last1=Griffiths | first1=Phillip | author1-link=Phillip Griffiths | last2=Harris | first2=Joseph | author2-link=Joe Harris (mathematician) | title=Principles of algebraic geometry | publisher=[[John Wiley & Sons]] | location=New York | series=Wiley Classics Library | isbn=978-0-471-05059-9 | mr=1288523 | year=1994}}
*{{Citation
  | last = Hörmander
  | first = Lars
  | author-link = Lars Hörmander
  | title = An Introduction to Complex Analysis in Several Variables
  | place = Amsterdam–London–New York–Tokyo
  | publisher = [[Elsevier|North-Holland]]
  | origyear = 1966
  | year = 1990
| series = North–Holland Mathematical Library
  | volume = 7
  | edition = 3rd (Revised)
  | url =
  | doi =
  | mr = 1045639
  | zbl = 0685.32001
  | isbn = 0-444-88446-7
}}
*{{Kobayashi-Nomizu}}
 
[[Category:Complex manifolds]]
[[Category:Several complex variables]]

Revision as of 06:10, 22 January 2014

In mathematics, complex geometry is the study of complex manifolds and functions of many complex variables. Application of transcendental methods to algebraic geometry falls in this category, together with more geometric chapters of complex analysis.

Throughout this article, "analytic" is often dropped for simplicity; for instance, subvarieties or hypersurfaces refer to analytic ones. Following the convention in Wikipedia, varieties are assumed to be irreducible.

Definitions

An analytic subset of a complex-analytic manifold M is locally the zero-locus of some family of holomorphic functions on M. It is called an analytic subvariety if it is irreducible in the Zariski topology.

Line bundles and divisors

Throughout this section, X denotes a complex manifold.

Let Pic(X) be the set of all isomorphism classes of line bundles on X. It is called the Picard group of X and is naturally isomorphic to H1(X,𝒪*). Taking the short exact sequence of

0𝒪𝒪*0

where the second map is fexp(2πif) yields a homomorphism of groups:

Pic(X)H2(X,).

The image of a line bundle under this map is denoted by c1() and is called the first Chern class of .

A divisor D on X is a formal sum of hypersurfaces (subvariety of codimension one):

D=aiVi,ai

that is locally a finite sum.[1] The set of all divisors on X is denoted by Div(X). It can be canonically identified with H0(X,*/𝒪*). Taking the long exact sequence of the quotient */𝒪*, one obtains a homomorphism:

Div(X)Pic(X).

A line bundle is said to be positive if its first Chern class is represented by a closed positive real (1,1)-form. Equivalently, a line bundle is positive if it admits a hermitian structure such that the induced connection has Griffiths-positive curvature. A complex manifold admitting a positive line bundle is kähler.

The Kodaira embedding theorem states that a line bundle on a compact kähler manifold is positive if and only if it is ample.

Complex vector bundles

Let X be a differentiable manifold. The basic invariant of a complex vector bundle π:EX is the Chern class of the bundle. By definition, it is a sequence c1,c2, such that ci(E) is an element of H2i(X,) and that satisfies the following axioms:[2]

  1. ci(f*(E))=f*(ci(E)) for any differentiable map f:ZX.
  2. c(EF)=c(E)c(F) where F is another bundle and c=1+c1+c2+.
  3. ci(E)=0 for i>rkE.
  4. c1(E1) generates H2(P1,) where E1 is the canonical line bundle over P1.

If L is a line bundle, then the Chern character of L is given by

ch(L)=ec1(L).

More generally, if E is a vector bundle of rank r, then we have the formal factorization: ci(E)ti=1r(1+ηit) and then we set

ch(E)=eηi.

Methods from harmonic analysis

Some deep results in complex geometry are obtained with the aid of harmonic analysis.

Vanishing theorem

There are several versions of vanishing theorems in complex geometry for both compact and non-compact complex manifolds. They are however all based on the Bochner method.

See also

References

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  • Template:Kobayashi-Nomizu
  1. This last condition is automatic for a noetherian scheme or a compact complex manifold.
  2. Template:Harvnb