nLab quaternion-Kähler manifold

Redirected from "quaternion-Kähler orbifolds".

Contents

Context

Riemannian geometry

Definition
Properties

As part of the Berger classification
As $\mathbb{H}$ -Riemannian manifolds
As quaternionic manifolds
As Einstein manifolds
Characteristic classes
Reduction to hyper-Kähler structure
Positive quaternion-Kähler manifolds

Examples
Related concepts
References

Definition

A Riemannian manifold $(X,g)$ of dimension $4n$ for $n \geq 2$ is called a quaternion-Kähler manifold if its holonomy group is a subgroup of Sp(n).Sp(1) (where Sp(n) is the $n$ th quaternionic unitary group, and in particular $Sp(1) \simeq SU(2) \simeq$ Spin(3), and the central product is the quotient group of the direct product group by the diagonal center $\mathbb{Z}/2$ ).

If the holonomy group is in fact a subgroup of just the $Sp(n)$ -factor, one speaks of a hyperkähler manifold.

Quaternion-Kähler manifolds are necessarily Einstein manifolds (see below). In particular their scalar curvature $R$ is constant, and hence a real number $R \in \mathbb{R}$ . If the scalar curvature is positive, then one speaks of a positive quaternion-Kähler manifold.

Properties

As part of the Berger classification

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 $\,$

As $\mathbb{H}$ -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)

As quaternionic manifolds

Example

(quaternion-Kähler manifolds are quaternionic manifolds)

By definition, a quaternion-Kähler manifold $M$ has holonomy group contained in the direct product group Sp(n) $\times$ Sp(1), admitting an extension of the Levi-Civita connection $\nabla$ on the holonomy bundle as torsion-free. Thus a quaternion-Kähler manifold is automatically a quaternionic manifold.

Such extension $\nabla_\text{quat}$ of $\nabla$ however is not unique, since $\nabla_\text{quat} + \mathcal{S}$ is another Sp(n)Sp(1)-preserving connection, where $\mathcal{S}$ is a (1, 2)-tensor such that for every $p \in M$ , $\mathcal{S}(p)$ takes values in the first prolongation of the Lie algebra for the G-structure.

As Einstein manifolds

quaternion-Kähler manifolds are Einstein manifolds (e.g. Cortés 05, slide 22)

Characteristic classes

Proposition

Let $X$ be a closed smooth manifold of dimension 8 with Spin structure. If the frame bundle moreover admits G-structure for

$\;\;G =$ Sp(2).Sp(1) $\hookrightarrow$ SO(8)

then the Euler class $\chi$ , the second Pontryagin class $p_2$ and the cup product-square $(p_1)^2$ of the first Pontryagin class of the frame bundle/tangent bundle are related by

(1)

8 \chi \;=\; 4 p_2 - (p_1)^2 \,.

(Čadek-Vanžura 98, Theorem 8.1 with Remark 8.2)

Remark

The same conclusion (1) also holds for $Spin(7)$ -structure, see there

See also at C-field tadpole cancellation.

Reduction to hyper-Kähler structure

A quaternion-Kähler manifold $(X,g)$ is a hyper-Kähler manifold, hence has $Sp(n) \hookrightarrow Sp(n)\cdot Sp(1)$ -structure, precisely if its scalar curvature, which is a constant by $(X,g)$ being an Einstein manifold, vanishes: $R(g) = 0$ .

(e.g. Amann 09, below Def. 1.5)

Positive quaternion-Kähler manifolds

Definition

A quaternion-Kähler manifold $(X,g)$ is called positive if

it is a geodesically complete
its scalar curvature, which is a constant by $(X,g)$ being an Einstein manifold, is a positive number, $R(g) \gt 0$ .

(Salamon 82, Section 6, see e.g. Amann 09, Def. 1.5)

In fact the Wolf spaces are the only known examples of positive quaternion-Kähler manifold (which is not hyper-Kähler ?!), as of today (e.g. Salamon 82, Section 5).

This leads to the conjecture that in every dimension, the Wolf spaces are the only positive quaternion-Kähler manifolds.

The conjecture has been proven for the following dimensions

$d = 4$ (Hitchin)
$d = 8$ (Poon-Salamon 91, LeBrun-Salamon 94)

Examples

The archetypical example is

quaternionic projective plane $\,\mathbb{H}P^2$

This is the first of the list of examples of spaces that are both quaternion-Kähler manifolds as well as symmetric spaces, called Wolf spaces.

See around Prop. above.

Related concepts

quaternionic manifold, Kähler manifold, hyper-Kähler manifold

References

Original articles:

Simon Salamon, Quaternionic Kähler manifolds, Invent Math (1982) 67: 143. (doi:10.1007/BF01393378)
Y. S. Poon, Simon Salamon, Quaternionic Kähler 8-manifolds with positive scalar curvature, J. Differential Geom. Volume 33, Number 2 (1991), 363-378 (euclid:1214446322)
Claude LeBrun, Simon Salamon, Strong rigidity of positive quaternion Kähler manifolds, Inventiones Mathematicae 118, 1994, 109–132 (dml:144231, doi:10.1007/BF01231528)

Exposition:

Vicente Cortés, Quaternionic Kähler manifolds, 2005 (pdf)

Textbook accounts:

Arthur Besse, Einstein Manifolds, Springer-Verlag 1987.
Dominic Joyce, Compact Manifolds with Special Holonomy, Oxford University Press, 2000.

nLab quaternion-Kähler manifold

Context

Riemannian geometry

Basic definitions

Further concepts

Theorems

Applications

Contents

Definition

Properties

As part of the Berger classification

As $\mathbb{H}$ -Riemannian manifolds

As quaternionic manifolds

Example

As Einstein manifolds

Characteristic classes

Proposition

Remark

Reduction to hyper-Kähler structure

Positive quaternion-Kähler manifolds

Definition

Proposition

Proposition

Proposition

Proposition

Examples

Related concepts

References

nLab quaternion-Kähler manifold

Context

Riemannian geometry

Basic definitions

Further concepts

Theorems

Applications

Contents

Definition

Properties

As part of the Berger classification

As ℍ\mathbb{H}-Riemannian manifolds

As quaternionic manifolds

Example

As Einstein manifolds

Characteristic classes

Proposition

Remark

Reduction to hyper-Kähler structure

Positive quaternion-Kähler manifolds

Definition

Proposition

Proposition

Proposition

Proposition

Examples

Related concepts

References

As $\mathbb{H}$ -Riemannian manifolds