Hopf manifold
A complex Hopf manifold is a quotient of $ \mathbf C ^ {n} \setminus \{ 0 \} $
by the infinite cyclic group of holomorphic transformations generated by $ z \mapsto \lambda z $,
$ \lambda \in \mathbf C \setminus \{ 0 \} $,
$ | \lambda | \neq 1 $.
It is usually denoted by $ \mathbf C H _ \lambda ^ {n} $.
As a differentiable manifold, any $ \mathbf C H _ \lambda ^ {n} $
is diffeomorphic to $ S ^ {2n - 1 } \times S ^ {1} $.
Consequently, when $ n \geq 2 $
the first Betti number $ b _ {1} ( \mathbf C H _ \lambda ^ {n} ) = 1 $;
hence, such $ \mathbf C H _ \lambda ^ {n} $
provide examples of compact complex manifolds (cf. Complex manifold) not admitting any Kähler metric (note that, for $ n = 1 $,
$ \mathbf C H _ \lambda ^ {1} $
is a $ 1 $-
dimensional complex torus). However, these manifolds do carry a particularly interesting class of Hermitian metrics (cf. Hermitian metric), namely locally conformal Kähler metrics (a Hermitian metric is locally conformal Kähler if its fundamental $ 2 $-
form $ \Omega $
satisfies the integrability condition $ d \Omega = \omega \wedge \Omega $
with a closed $ 1 $-
form $ \omega $,
called the Lee form). An example of such a metric is the projection of the following metric on $ \mathbf C ^ {n} \setminus \{ 0 \} $:
$ g _ {0} = | z | ^ {- 2 } \delta _ {jk } dz ^ {j} \otimes d {\overline{z}\; } ^ {k} $,
whose Lee form is $ \omega _ {0} = | z | ^ {- 2 } \sum ( z ^ {j} d {\overline{z}\; } ^ {j} + {\overline{z}\; } ^ {j} dz ^ {j} ) $.
It is parallel with respect to the Levi-Civita connection of $ g _ {0} $.
This originated the study of the more general class of generalized Hopf manifolds: locally conformal Kähler manifolds with parallel Lee form. Their geometry is closely related to Sasakian and Kählerian geometries. Generically, a compact generalized Hopf manifold arises as the total space of a flat, principal $ S ^ {1} $
bundle over a compact Sasakian orbifold and, on the other hand, fibres into $ 1 $-
dimensional complex tori over a Kähler orbifold.
I. Vaisman conjectured that a compact locally conformal Kähler manifold that is not globally conformal Kähler must have an odd Betti number. To date (1996), this has only been proved for generalized Hopf manifolds (see [a5]).
It is rather difficult to characterize the Hopf manifolds among the locally conformal Kähler manifolds. However, in complex dimension $ 2 $ several such characterizations are available; for instance, the only compact complex surface with $ b _ {1} = 1 $ and admitting conformally flat Hermitian metrics is $ \mathbf C H _ \lambda ^ {2} $( cf. [a4]; see also [a1]).
By analogy, "real Hopf manifoldreal Hopf manifolds" were defined as (compact) quotients of $ \mathbf R ^ {n} \setminus \{ 0 \} $ by an appropriate group of conformal transformations (see [a6] and [a2]). Similarly, "quaternion Hopf manifoldquaternion Hopf manifolds" are defined as quotients of $ \mathbf H ^ {n} \setminus \{ 0 \} $( see [a3]).
References
[a1] | C.P. Boyer, "Conformal duality and compact complex surfaces" Math. Ann. , 274 (1986) pp. 517–526 |
[a2] | P. Gauduchon, "Structures de Weyl–Einstein, espaces de twisteurs et variétés de type " J. Reine Angew. Math. , 455 (1995) pp. 1–50 |
[a3] | L. Ornea, P. Piccinni, "Locally conformal Kähler structures in quaternionic geometry" Trans. Amer. Math. Soc. , 349 (1997) pp. 641–655 |
[a4] | M. Pontecorvo, "Uniformization of conformally flat Hermitian surfaces" Diff. Geom. Appl. , 3 (1992) pp. 295–305 |
[a5] | I. Vaisman, "Generalized Hopf manifolds" Geom. Dedicata , 13 (1982) pp. 231–255 |
[a6] | I. Vaisman, C. Reischer, "Local similarity manifolds" Ann. Mat. Pura Appl. , 35 (1983) pp. 279–292 |
[a7] | S. Dragomir, L. Ornea, "Locally conformal Kähler geometry" , Birkhäuser (1997) |
Hopf manifold. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Hopf_manifold&oldid=18689