Hyperkähler manifold

(Redirected from Hyper-Kaehler manifold)

In differential geometry, a hyperkähler manifold is a Riemannian manifold endowed with three integrable almost complex structures that are Kähler with respect to the Riemannian metric and satisfy the quaternionic relations . In particular, it is a hypercomplex manifold. All hyperkähler manifolds are Ricci-flat and are thus Calabi–Yau manifolds.[a]

Hyperkähler manifolds were defined by Eugenio Calabi in 1979.[1]

Early history

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Marcel Berger's 1955 paper[2] on the classification of Riemannian holonomy groups first raised the issue of the existence of non-symmetric manifolds with holonomy Sp(n)·Sp(1).Interesting results were proved in the mid-1960s in pioneering work by Edmond Bonan[3] and Kraines[4] who have independently proven that any such manifold admits a parallel 4-form  .The long awaited analog of strong Lefschetz theorem was published [5] in 1982 :  

Equivalent definition in terms of holonomy

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Equivalently, a hyperkähler manifold is a Riemannian manifold   of dimension   whose holonomy group is contained in the compact symplectic group Sp(n).[1]

Indeed, if   is a hyperkähler manifold, then the tangent space TxM is a quaternionic vector space for each point x of M, i.e. it is isomorphic to   for some integer  , where   is the algebra of quaternions. The compact symplectic group Sp(n) can be considered as the group of orthogonal transformations of   which are linear with respect to I, J and K. From this, it follows that the holonomy group of the Riemannian manifold   is contained in Sp(n). Conversely, if the holonomy group of a Riemannian manifold   of dimension   is contained in Sp(n), choose complex structures Ix, Jx and Kx on TxM which make TxM into a quaternionic vector space. Parallel transport of these complex structures gives the required complex structures   on M making   into a hyperkähler manifold.

Two-sphere of complex structures

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Every hyperkähler manifold   has a 2-sphere of complex structures with respect to which the metric   is Kähler. Indeed, for any real numbers   such that

 

the linear combination

 

is a complex structures that is Kähler with respect to  . If   denotes the Kähler forms of  , respectively, then the Kähler form of   is

 

Holomorphic symplectic form

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A hyperkähler manifold  , considered as a complex manifold  , is holomorphically symplectic (equipped with a holomorphic, non-degenerate, closed 2-form). More precisely, if   denotes the Kähler forms of  , respectively, then

 

is holomorphic symplectic with respect to  .

Conversely, Shing-Tung Yau's proof of the Calabi conjecture implies that a compact, Kähler, holomorphically symplectic manifold   is always equipped with a compatible hyperkähler metric.[6] Such a metric is unique in a given Kähler class. Compact hyperkähler manifolds have been extensively studied using techniques from algebraic geometry, sometimes under the name holomorphically symplectic manifolds. The holonomy group of any Calabi–Yau metric on a simply connected compact holomorphically symplectic manifold of complex dimension   with   is exactly Sp(n); and if the simply connected Calabi–Yau manifold instead has  , it is just the Riemannian product of lower-dimensional hyperkähler manifolds. This fact immediately follows from the Bochner formula for holomorphic forms on a Kähler manifold, together the Berger classification of holonomy groups; ironically, it is often attributed to Bogomolov, who incorrectly went on to claim in the same paper that compact hyperkähler manifolds actually do not exist!

Examples

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For any integer  , the space   of  -tuples of quaternions endowed with the flat Euclidean metric is a hyperkähler manifold. The first non-trivial example discovered is the Eguchi–Hanson metric on the cotangent bundle   of the two-sphere. It was also independently discovered by Eugenio Calabi, who showed the more general statement that cotangent bundle   of any complex projective space has a complete hyperkähler metric.[1] More generally, Birte Feix and Dmitry Kaledin showed that the cotangent bundle of any Kähler manifold has a hyperkähler structure on a neighbourhood of its zero section, although it is generally incomplete.[7][8]

Due to Kunihiko Kodaira's classification of complex surfaces, we know that any compact hyperkähler 4-manifold is either a K3 surface or a compact torus  . (Every Calabi–Yau manifold in 4 (real) dimensions is a hyperkähler manifold, because SU(2) is isomorphic to Sp(1).)

As was discovered by Beauville,[6] the Hilbert scheme of k points on a compact hyperkähler 4-manifold is a hyperkähler manifold of dimension 4k. This gives rise to two series of compact examples: Hilbert schemes of points on a K3 surface and generalized Kummer varieties.

Non-compact, complete, hyperkähler 4-manifolds which are asymptotic to H/G, where H denotes the quaternions and G is a finite subgroup of Sp(1), are known as asymptotically locally Euclidean, or ALE, spaces. These spaces, and various generalizations involving different asymptotic behaviors, are studied in physics under the name gravitational instantons. The Gibbons–Hawking ansatz gives examples invariant under a circle action.

Many examples of noncompact hyperkähler manifolds arise as moduli spaces of solutions to certain gauge theory equations which arise from the dimensional reduction of the anti-self dual Yang–Mills equations: instanton moduli spaces,[9] monopole moduli spaces,[10] spaces of solutions to Nigel Hitchin's self-duality equations on Riemann surfaces,[11] space of solutions to Nahm equations. Another class of examples are the Nakajima quiver varieties,[12] which are of great importance in representation theory.

Cohomology

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Kurnosov, Soldatenkov & Verbitsky (2019) show that the cohomology of any compact hyperkähler manifold embeds into the cohomology of a torus, in a way that preserves the Hodge structure.

Notes

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  1. ^ This can be easily seen by noting that Sp(n) is a subgroup of the special unitary group SU(2n).

See also

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References

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  1. ^ a b c Calabi, Eugenio (1979). "Métriques kählériennes et fibrés holomorphes". Annales Scientifiques de l'École Normale Supérieure. Quatrième Série, 12 (2): 269–294. doi:10.24033/asens.1367.
  2. ^ Berger, Marcel (1955). "Sur les groups d'holonomie des variétés à connexion affine et des variétés riemanniennes" (PDF). Bull. Soc. Math. France. 83: 279–330. doi:10.24033/bsmf.1464.
  3. ^ Bonan, Edmond (1965). "Structure presque quaternale sur une variété differentiable". Comptes Rendus de l'Académie des Sciences. 261: 5445–8.
  4. ^ Kraines, Vivian Yoh (1966). "Topology of quaternionic manifolds" (PDF). Transactions of the American Mathematical Society. 122 (2): 357–367. doi:10.1090/S0002-9947-1966-0192513-X. JSTOR 1994553.
  5. ^ Bonan, Edmond (1982). "Sur l'algèbre extérieure d'une variété presque hermitienne quaternionique". Comptes Rendus de l'Académie des Sciences. 295: 115–118.
  6. ^ a b Beauville, A. Variétés Kähleriennes dont la première classe de Chern est nulle. J. Differential Geom. 18 (1983), no. 4, 755–782 (1984).
  7. ^ Feix, B. Hyperkähler metrics on cotangent bundles. J. Reine Angew. Math. 532 (2001), 33–46.
  8. ^ Kaledin, D. A canonical hyperkähler metric on the total space of a cotangent bundle. Quaternionic structures in mathematics and physics (Rome, 1999), 195–230, Univ. Studi Roma "La Sapienza", Rome, 1999.
  9. ^ Maciocia, A. Metrics on the moduli spaces of instantons over Euclidean 4-space. Comm. Math. Phys. 135 (1991), no. 3, 467–482.
  10. ^ Atiyah, M.; Hitchin, N. The geometry and dynamics of magnetic monopoles. M. B. Porter Lectures. Princeton University Press, Princeton, NJ, 1988.
  11. ^ Hitchin, N. The self-duality equations on a Riemann surface. Proc. London Math. Soc. (3) 55 (1987), no. 1, 59–126.
  12. ^ Nakajima, H. Instantons on ALE spaces, quiver varieties, and Kac-Moody algebras. Duke Math. J. 76 (1994), no. 2, 365–416.