Calabi–Eckmann manifold

In complex geometry, a part of mathematics, a Calabi–Eckmann manifold (or, often, Calabi–Eckmann space), named after Eugenio Calabi and Beno Eckmann, is a complex, homogeneous, non-Kähler manifold, homeomorphic to a product of two odd-dimensional spheres of dimension ≥ 3.

The Calabi–Eckmann manifold is constructed as follows. Consider the space $\{\backslash mathbb\; C\}^n\backslash backslash\; \backslash \{0\backslash \}\; \backslash times\; \{\backslash mathbb\; C\}^m\backslash backslash\; \backslash \{0\backslash \}$, where $m,n>1$, equipped with an action of the group $\{\backslash mathbb\; C\}$:

: $t\backslash in\; \{\backslash mathbb\; C\},\; \backslash \; (x,y)\backslash in\; \{\backslash mathbb\; C\}^n\backslash backslash\; \backslash \{0\backslash \}\; \backslash times\; \{\backslash mathbb\; C\}^m\backslash backslash\; \backslash \{0\backslash \}\; \backslash mid\; t(x,y)=\; (e^tx,\; e^\{\backslash alpha\; t\}y)$

where $\backslash alpha\backslash in\; \{\backslash mathbb\; C\}\backslash backslash\; \{\backslash mathbb\; R\}$ is a fixed complex number. It is easy to check that this action is free and proper, and the corresponding orbit space M is homeomorphic to $S^\{2n-1\}\backslash times\; S^\{2m-1\}$. Since M is a quotient space of a holomorphic action, it is also a complex manifold. It is obviously homogeneous, with a transitive holomorphic action of $\backslash operatorname\{GL\}(n,\{\backslash mathbb\; C\})\; \backslash times\; \backslash operatorname\{GL\}(m,\; \{\backslash mathbb\; C\})$

A Calabi–Eckmann manifold M is non-Kähler, because $H^2(M)=0$. It is the simplest example of a non-Kähler

manifold which is simply connected (in dimension 2, all simply connected compact complex manifolds are Kähler).

The natural projection

: $\{\backslash mathbb\; C\}^n\backslash backslash\; \backslash \{0\backslash \}\; \backslash times\; \{\backslash mathbb\; C\}^m\backslash backslash\; \backslash \{0\backslash \}\backslash mapsto\; \{\backslash mathbb\; C\}P^\{n-1\}\backslash times\; \{\backslash mathbb\; C\}P^\{m-1\}$

induces a holomorphic map from the corresponding Calabi–Eckmann manifold M to $\{\backslash mathbb\; C\}P^\{n-1\}\backslash times\; \{\backslash mathbb\; C\}P^\{m-1\}$. The fiber of this map is an elliptic curve T, obtained as a quotient of $\backslash mathbb\; C$ by the lattice $\{\backslash mathbb\; Z\}\; +\; \backslash alpha\backslash cdot\; \{\backslash mathbb\; Z\}$. This makes M into a principal T-bundle.

Calabi and Eckmann discovered these manifolds in 1953.{{citation|first1=Eugenio|last1= Calabi|authorlink1=Eugenio Calabi|

first2=Benno|last2= Eckmann|authorlink2=Beno Eckmann|title= A class of compact complex manifolds which are not algebraic|journal= Annals of Mathematics|volume= 58|pages= 494–500|year=1953}}