nLab Kähler manifold

Redirected from "Kähler geometry".

Contents

Context

Differential geometry

Complex geometry

Idea
Definition

Linear Kähler structure
Kähler manifolds
In terms of $G$ -Structure

Examples
Properties

Relation to (almost) complex manifold
Relation to symplectic manifolds
Relation to Spin-structures
Hodge star operator
Hodge structure
As $\mathbb{C}$ -Riemannian manifolds

Related concepts
References

Idea

A Kähler manifold is a smooth manifold compatibly equipped with

If the symplectic structure is not compatibly present, it is just a Hermitian manifold.

complex structure	+ Riemannian structure	+ symplectic structure
complex structure	Hermitian structure	Kähler structure

Where a Riemannian manifold is a real smooth manifold equipped with a nondegenerate smooth symmetric 2-form $g$ (the Riemannian metric), an almost Kähler manifold is a complex holomorphic manifold equipped with a nondegenerate hermitian 2-form $h$ (the Kähler $2$ -form). The real cotangent bundle is replaced with the complex cotangent bundle, and symmetry is replaced with hermitian symmetry. An almost Kähler manifold is a Kähler manifold if it satisfies an additional integrability condition.

The Kähler 2-form can be decomposed as $h = g+i\omega$ ; here $g$ is a Riemannian metric and $\omega$ a symplectic form.

Definition

Linear Kähler structure

Definition

(Kähler vector space)

Let $V$ be a finite-dimensional real vector space. Then a linear Kähler structure on $V$ is

a linear complex structure on $V$ , namely a linear endomorphism

$J \;\colon\; V \to V$

whose composition with itself is minus the identity morphism:

$J \circ J = - id_V$
a skew-symmetric bilinear form

$\omega \in \wedge^2 V^\ast$

such that

$\omega(J(-),J(-)) = \omega(-,-)$ ;
$g(-,-) \coloneqq \omega(-,J(-))$ is a Riemannian metric, namely

a non-degenerate positive-definite bilinear form on $V$

(necessarily symmetric, due to the other properties: $g(w,v) = \omega(w,J(v)) = -\omega(J(v),w) = - \omega(J(J(v)), J(w)) = +\omega(v,J(w)) = g(v,w)$ ).

(e.g. Boalch 09, p. 26-27)

Linear Kähler space structure may conveniently be encoded in terms of Hermitian space structure:

Definition

(Hermitian form and Hermitian space)

Let $V$ be a real vector space equipped with a complex structure $J\colon V \to V$ . Then a Hermitian form on $V$ is

a complex-valued real-bilinear form

$h \;\colon\; V \otimes V \longrightarrow \mathbb{C}$

such that this is symmetric sesquilinear, in that:

$h$ is complex-linear in the first argument;
$h(w,v) = \left(h(v,w) \right)^\ast$ for all $v,w \in V$

where $(-)^\ast$ denotes complex conjugation.

A Hermitian form is positive definite (often assumed by default) if for all $v \in V$

$h(v,v) \geq 0$
$h(v,v) = 0 \phantom{AA} \Leftrightarrow \phantom{AA} v = 0$ .

A complex vector space $(V,J)$ equipped with a (positive definite) Hermitian form $h$ is called a (positive definite) Hermitian space.

Proposition

(basic properties of Hermitian forms)

Let $((V,J),h)$ be a positive definite Hermitian space (def. ). Then

the real part of the Hermitian form

$g(-,-) \;\coloneqq\; Re(h(-,-))$

is a Riemannian metric, hence a symmetric positive-definite real-bilinear form

$g \;\colon\; V \otimes V \to \mathbb{R}$
the imaginary part of the Hermitian form

$\omega(-,-) \;\coloneqq\; -Im(h(-,-))$

is a symplectic form, hence a non-degenerate skew-symmetric real-bilinear form

$\omega \;\colon\; V \wedge V \to \mathbb{R} \,.$

hence

h = g - i \omega \,.

The two components are related by

(1)

\omega(v,w) \;=\; g(J(v),w) \phantom{AAAAA} g(v,w) \;=\; \omega(v,J(v)) \,.

Finally

h(J(-),J(-)) = h(-,-)

and so the Riemannian metrics $g$ on $V$ appearing from (and fully determining) Hermitian forms $h$ via $h = g - i \omega$ are precisely those for which

(2)

g(J(-),J(-)) = g(-,-) \,.

These are called the Hermitian metrics.

Proof

The positive-definiteness of $g$ is immediate from that of $h$ . The symmetry of $g$ follows from the symmetric sesquilinearity of $h$ :

\begin{aligned} g(w,v) & \coloneqq Re(h(w,v)) \\ & = Re\left( h(v,w)^\ast\right) \\ & = Re(h(v,w)) \\ & = g(v,w) \,. \end{aligned}

That $h$ is invariant under $J$ follows from its sesquilinarity

\begin{aligned} h(J(v),J(w)) &= i h(v,J(w)) \\ & = i (h(J(w),v))^\ast \\ & = i (-i) (h(w,v))^\ast \\ & = h(v,w) \end{aligned}

and this immediately implies the corresponding invariance of $g$ and $\omega$ .

Analogously it follows that $\omega$ is skew symmetric:

\begin{aligned} \omega(w,v) & \coloneqq -Im(h(w,v)) \\ & = -Im\left( h(v,w)^\ast\right) \\ & = Im(h(v,w)) \\ & = - \omega(v,w) \,, \end{aligned}

and the relation between the two components:

\begin{aligned} \omega(v,w) & = - Im(h(v,w)) \\ & = Re(i h(v,w)) \\ & = Re(h(J(v),w)) \\ & = g(J(v),w) \end{aligned}

as well as

\begin{aligned} g(v,w) & = Re(h(v,w) \\ & = Im(i h(v,w)) \\ & = Im(h(J(v),w)) \\ & = Im(h(J^2(v),J(w))) \\ & = - Im(h(v,J(w))) \\ & = \omega(v,J(w)) \,. \end{aligned}

As a corollary:

Proposition

(relation between Kähler vector spaces and Hermitian spaces)

Given a real vector space $V$ with a linear complex structure $J$ , then the following are equivalent:

$\omega \in \wedge^2 V^\ast$ is a linear Kähler structure (def. );
$g \in V \otimes V \to \mathbb{R}$ is a Hermitian metric (2)

where $\omega$ and $g$ are related by (1)

\omega(v,w) \;=\; g(J(v),w) \phantom{AAAAA} g(v,w) \;=\; \omega(v,J(w)) \,.

Kähler manifolds

(…)

In terms of $G$ -Structure

A Kähler manifold is a first-order integrable almost Hermitian structure, hence a first order integrable G-structure for $G = U(n) \hookrightarrow GL(2n,\mathbb{R})$ the unitary group.

By the fact (see at unitary group – relation to orthogonal, symplectic and general linear group) that $U(n) \simeq O(2n) \underset{GL(2n,\mathbb{R})}{\times} Sp(2n,\mathbb{R}) \underset{GL(2n,\mathbb{R})}{\times} GL(n,\mathbb{C})$ this means that a Kähler manifold structure is precisely a joint orthogonal structure/Riemannian manifold structure, symplectic manifold structure and complex manifold structure.

(e.g. Moroianu 07, 11.1, Verbitsky 09)

Examples

The archetypical elementary example is the following:

Example

(standard Kähler vector space)

Let $V \coloneqq \mathbb{R}^2$ be the 2-dimensional real vector space equipped with the complex structure $J$ which is given by the canonical identification $\mathbb{R}^2 \simeq \mathbb{C}$ , hence, in terms of the canonical linear basis $(e_i)$ of $\mathbb{R}^2$ , this is

J = (J^i{}_j) \coloneqq \left( \array{ 0 & -1 \\ 1 & 0 } \right) \,.

Moreover let

\omega = (\omega_{i j}) \coloneqq \left( \array{0 & 1 \\ -1 & 0} \right)

and

g = (g_{i j}) \coloneqq \left( \array{ 1 & 0 \\ 0 & 1} \right) \,.

Then $(V, J, \omega, g)$ is a Kähler vector space (def. )

The corresponding Kähler manifold is $\mathbb{R}^2$ regarded as a smooth manifold in the standard way and equipped with the bilinear forms $J, \omega g$ extended as constant rank-2 tensors over this manifold.

If we write

x,y \;\colon\; \mathbb{R}^2 \longrightarrow \mathbb{R}

for the standard coordinate functions on $\mathbb{R}^2$ with

z \coloneqq x + i y \;\coloneqq\; \mathbb{R}^2 \to \mathbb{C}

and

\overline{z} \coloneqq x - i y \;\coloneqq\; \mathbb{R}^2 \to \mathbb{C}

for the corresponding complex coordinates, then this translates to

\omega \in \Omega^2(\mathbb{R}^2)

being the differential 2-form given by

\begin{aligned} \omega & = d x \wedge d y \\ & = \tfrac{i}{2} d z \wedge d \overline{z} \end{aligned}

and with Riemannian metric tensor given by

g = d x \otimes d x + d y \otimes d y \,.

The Hermitian form is given by

\begin{aligned} h & = g - i \omega \\ & = d z \otimes d \overline{z} \,. \end{aligned}

Proof

This is elementary, but, for the record, here is one way to make it fully explicit (we use Einstein summation convention and “ $\cdot$ ” denotes matrix multiplication):

\begin{aligned} \omega_{i j'} J^{j'}{}_j & = \left( \array{ 0 & 1 \\ -1 & 0 } \right) \cdot \left( \array{ 0 & -1 \\ 1 & 0 } \right) \\ & = \left( \array{ 1 & 0 \\ 0 & 1 } \right) \\ & = g_{i j} \end{aligned}

and similarly

\begin{aligned} \omega(J(-),J(-))_{i j} & = \omega_{i' j'} J^{i'}{}_{i} J^{j'}{}_{j} \\ & = (J^t \cdot \omega \cdot J)_{i j} \\ & = \left( \left( \array{ 0 & 1 \\ -1 & 0 } \right) \cdot \left( \array{ 0 & 1 \\ -1 & 0 } \right) \cdot \left( \array{ 0 & -1 \\ 1 & 0 } \right) \right)_{i j} \\ & = \left( \left( \array{ -1 & 0 \\ 0 & -1 } \right) \cdot \left( \array{ 0 & -1 \\ 1 & 0 } \right) \right)_{i j} \\ & = \left( \array{ 0 & 1 \\ -1 & 0 } \right)_{i j} \\ & = \omega_{i j} \end{aligned}

Example

(Fubini-Study metric)

There is a unique (up to a scalar) hermitian metric on complex projective space (which may be normalized), the Fubini-Study metric.

All analytic subvarieties of a complex projective space are in fact algebraic subvarieties and they inherit the Kähler structure from the projective space.

Examples include complex tori $\mathbb{C}^n/L$ where $L$ is a lattice in $\mathbb{C}^n$ , K3-surfaces, compact Calabi-Yau manifolds, quadrics, products of projective spaces and so on.

Properties

Relation to (almost) complex manifold

The following based on this MO comment by Spiro Karigiannis

When $(X, J)$ is an almost complex manifold, then there is a notion of smooth complex-valued differential forms of type $(p,q)$ . A complex valued $2$ -form $\omega$ is of type $(1,1)$ precisely if it satisfies

\omega(J v,J w) = \omega(v,w)

for all smooth vector fields $v,w$ on $X$ . Here $\omega$ is a real $2$ -form of type $(1,1)$ , if $\overline \omega = \omega$ . Setting

g(v,w) = \omega(v, J w),

defines a smooth symmetric rank $(2,0)$ tensor field. This is a Riemannian metric precisely if it is fiberwise a positive definite bilinear form. If it $g(-,-) = \omega(-,J -)$ is hence a Riemannian metric, then $\omega(-,-)$ is called positive definite, too.

The triple of data $(J, \omega, g)$ , where $J$ is an almost complex structure, $\omega$ is a real positive $(1,1)$ -differential form, and $g$ is the associated Riemannian metric this way define an almost Hermitian manifold.

Now the condition for $X$ to be a Kähler is that $X$ be a complex manifold ( $J$ is integrable) and that $d\omega = 0$ . Equivalently that for the Levi-Civita connection $\nabla$ of $G$ we have $\nabla \omega = 0$ or $\nabla J = 0$ .

Hence given a complex manifold $X$ , together with a closed real $2$ -form $\omega$ , the only additional condition required to ensure that it defines a Kähler metric is that it be a positive $(1,1)$ -form.

Relation to symplectic manifolds

Lifting a symplectic manifold structure to a Kähler manifold structure is also called choosing a Kähler polarization.

Relation to Spin-structures

Proposition

A spin structure on a compact Hermitian manifold (Kähler manifold) $X$ of complex dimension $n$ exists precisely if, equivalently

there is a choice of square root $\sqrt{\Omega^{n,0}}$ of the canonical line bundle $\Omega^{n,0}$ (a “Theta characteristic”);
there is a trivialization of the first Chern class $c_1(T X)$ of the tangent bundle.

In this case one has:

Proposition

There is a natural isomorphism

S_X \simeq \Omega^{0,\bullet}_X \otimes \sqrt{\Omega^{n,0}}_X

of the sheaf of sections of the spinor bundle $S_X$ on $X$ with the tensor product of the Dolbeault complex with the corresponding Theta characteristic;

Moreover, the corresponding Dirac operator is the Dolbeault-Dirac operator $\overline{\partial} + \overline{\partial}^\ast$ .

This is due to (Hitchin 74). A textbook account is for instance in (Friedrich 74, around p. 79 and p. 82).

Hodge star operator

On a Kähler manifold $\Sigma$ of dimension $dim_{\mathbb{C}}(\Sigma) = n$ the Hodge star operator acts on the Dolbeault complex as

\star \;\colon\; \Omega^{p,q}(X) \longrightarrow \Omega^{n-q,n-p}(X) \,.

(notice the exchange of the role of $p$ and $q$ ) See e.g. (BiquerdHöring 08, p. 79).

Hodge structure

The Hodge theorem asserts that for a compact Kähler manifold, the canonical $(p,q)$ -grading of its differential forms descends to its de Rham cohomology/ordinary cohomology. The resulting structure is called a Hodge structure, and is indeed the archetypical example of such.

As $\mathbb{C}$ -Riemannian manifolds

$\;$ normed division algebra $\;$	$\;\mathbb{A}\;$	$\;$ Riemannian $\mathbb{A}$ -manifolds $\;$	$\;$ special Riemannian $\mathbb{A}$ -manifolds $\;$
$\;$ real numbers $\;$	$\;\mathbb{R}\;$	$\;$ Riemannian manifold $\;$	$\;$ oriented Riemannian manifold $\;$
$\;$ complex numbers $\;$	$\;\mathbb{C}\;$	$\;$ Kähler manifold $\;$	$\;$ Calabi-Yau manifold $\;$
$\;$ quaternions $\;$	$\;\mathbb{H}\;$	$\;$ quaternion-Kähler manifold $\;$	$\;$ hyperkähler manifold $\;$
$\;$ octonions $\;$	$\;\mathbb{O}\;$	$\;$ Spin(7)-manifold $\;$	$\;$ G₂-manifold $\;$

(Leung 02)

Related concepts

classification of special holonomy manifolds by Berger's theorem:

	$\,$ G-structure $\,$	$\,$ special holonomy $\,$	$\,$ dimension $\,$	$\,$ preserved differential form $\,$
$\,\mathbb{C}\,$	$\,$ Kähler manifold $\,$	$\,$ U(n) $\,$	$\,2n\,$	$\,$ Kähler forms $\omega_2\,$
	$\,$ Calabi-Yau manifold $\,$	$\,$ SU(n) $\,$	$\,2n\,$
$\,\mathbb{H}\,$	$\,$ quaternionic Kähler manifold $\,$	$\,$ Sp(n).Sp(1) $\,$	$\,4n\,$	$\,\omega_4 = \omega_1\wedge \omega_1+ \omega_2\wedge \omega_2 + \omega_3\wedge \omega_3\,$
	$\,$ hyper-Kähler manifold $\,$	$\,$ Sp(n) $\,$	$\,4n\,$	$\,\omega = a \omega^{(1)}_2+ b \omega^{(2)}_2 + c \omega^{(3)}_2\,$ ( $a^2 + b^2 + c^2 = 1$ )
$\,\mathbb{O}\,$	$\,$ Spin(7) manifold $\,$	$\,$ Spin(7) $\,$	$\,$ 8 $\,$	$\,$ Cayley form $\,$
	$\,$ G₂ manifold $\,$	$\,$ G₂ $\,$	$\,7\,$	$\,$ associative 3-form $\,$

References

Kähler manifolds were first introduced and studied by P. A. Shirokov (cf. a historical article) and later independently by Kähler.

Textbook accounts:

Claire Voisin, section 3 of Hodge theory and Complex algebraic geometry I,II, Cambridge Stud. in Adv. Math. 76, 77, 2002/3
Ana Cannas da Silva, §16 in: Lectures on Symplectic Geometry, Lecture Notes in Mathematics 1764, Springer (2008) [doi:10.1007/978-3-540-45330-7]

Lecture notes include

Andrei Moroianu, Lectures on Kähler Geometry, Cambridge University Press 2007 (arXiv:math/0402223 doi:10.1017/CBO9780511618666, pdf)
Philip Boalch, Noncompact complex symplectic and hyperkähler manifolds (2009) [pdf, pdf]

Discussion in terms of first-order integrable G-structure include

Moroianu 07, 11.1
Misha Verbitsky, Kähler manifolds, lecture notes 2009 (pdf)

Discussion of spin structures in Kähler manifolds is for instance in

Thomas Friedrich, Dirac operators in Riemannian geometry, Graduate studies in mathematics 25, AMS (1997)

Discussion of Hodge theory on Kähler manifolds is in

O. Biquard, A. Höring, Kähler geometry and Hodge theory, 2008 (pdf)

Discussion of Kähler orbifolds:

Thalia D. Jeffres, Singular Set of Some Kähler Orbifolds, Transactions of the American Mathematical Society Vol. 349, No. 5 (May, 1997), pp. 1961-1971 (jstor:2155355)
Akira Fujiki, On primitively symplectic compact Kähler V-manifolds, in: Kenji Ueno (ed.), Classification of Algebraic and Analytic Manifolds: Katata Symposium Proceedings 1982, Birkhäuser 1983 (ISBN:9780817631376)
Dominic Joyce, Section 6.5.1 of: Compact Manifolds with Special Holonomy, Oxford Mathematical Monographs, Oxford University Press (2000) (ISBN:9780198506010)
Miguel Abreu, Kähler Metrics on Toric Orbifolds, J. Differential Geom. Volume 58, Number 1 (2001), 151-187 (euclid:jdg/1090348285)
Giovanni Bazzoni, Indranil Biswas, Marisa Fernández, Vicente Muñoz, Aleksy Tralle, Homotopic properties of Kähler orbifolds, In: Chiossi S., Fino A., Musso E., Podestà F., Vezzoni L. (eds.) Special Metrics and Group Actions in Geometry Springer INdAM Series, vol 23. Springer (2017) (arXiv:1605.03024, doi:10.1007/978-3-319-67519-0_2)

Last revised on November 16, 2023 at 09:52:39. See the history of this page for a list of all contributions to it.

nLab Kähler manifold

Context

Differential geometry

Complex geometry

Variants

Structures

Examples

Contents

Idea

Definition

Linear Kähler structure

Definition

Definition

Proposition

Proof

Proposition

Kähler manifolds

In terms of $G$ -Structure

Examples

Example

Proof

Example

Properties

Relation to (almost) complex manifold

Relation to symplectic manifolds

Relation to Spin-structures

Proposition

Proposition

Hodge star operator

Hodge structure

As $\mathbb{C}$ -Riemannian manifolds

Related concepts

References

nLab Kähler manifold

Context

Differential geometry

Complex geometry

Variants

Structures

Examples

Contents

Idea

Definition

Linear Kähler structure

Definition

Definition

Proposition

Proof

Proposition

Kähler manifolds

In terms of GG-Structure

Examples

Example

Proof

Example

Properties

Relation to (almost) complex manifold

Relation to symplectic manifolds

Relation to Spin-structures

Proposition

Proposition

Hodge star operator

Hodge structure

As ℂ\mathbb{C}-Riemannian manifolds

Related concepts

References

In terms of $G$ -Structure

As $\mathbb{C}$ -Riemannian manifolds