A remark on compact symplectic manifolds not admitting complex structures

M. Fernández; Manuel de León; I. Rozas

Displaying similar documents to “A remark on compact symplectic manifolds not admitting complex structures”

Geography of symplectic 4-manifolds with Kodaira dimension one.

Baldridge, Scott, Li, Tian-Jun (2005)

Algebraic & Geometric Topology

Similarity:

Compact symplectic four solvmanifolds without polarizations

Luis A. Cordero, Marisa Fernández, Manuel De León, Martín Saralegui (1989)

Annales de la Faculté des sciences de Toulouse : Mathématiques

Similarity:

Compact symplectic four-dimensional manifolds not admitting polarizations

Marisa Fernández, Manuel de León (1989)

Commentationes Mathematicae Universitatis Carolinae

Similarity:

Symplectic structures on the tangent bundles of symplectic and cosymplectic manifolds

J. Kurek, W. M. Mikulski (2003)

Annales Polonici Mathematici

Similarity:

We describe all natural symplectic structures on the tangent bundles of symplectic and cosymplectic manifolds.

The Seiberg-Witten invariants of symplectic four-manifolds

Dieter Kotschick (1995-1996)

Séminaire Bourbaki

Similarity:

Classification of compact homogeneous spaces with invariant symplectic structures.

Guan, Daniel (1997)

Electronic Research Announcements of the American Mathematical Society [electronic only]

Similarity:

Formality and the Lefschetz property in symplectic and cosymplectic geometry

Giovanni Bazzoni, Marisa Fernández, Vicente Muñoz (2015)

Complex Manifolds

Similarity:

We review topological properties of Kähler and symplectic manifolds, and of their odd-dimensional counterparts, coKähler and cosymplectic manifolds. We focus on formality, Lefschetz property and parity of Betti numbers, also distinguishing the simply-connected case (in the Kähler/symplectic situation) and the b1 = 1 case (in the coKähler/cosymplectic situation).

On the number of components of the symplectic representatives of the canonical class

Stefano Vidussi (2007)

Journal of the European Mathematical Society

Similarity:

We show that there exists a family of simply connected, symplectic 4-manifolds such that the (Poincaré dual of the) canonical class admits both connected and disconnected symplectic representatives. This answers a question raised by Fintushel and Stern.

Lefschetz fibrations, complex structures and Seifert fibrations on $S^{1} \times M^{3}$ .

Etgü, Tolga (2001)

Algebraic & Geometric Topology

Similarity:

A Class of Non-Polarizable Symplectic Manifolds.

Mark J. Gotay (1987)

Monatshefte für Mathematik

Similarity: