We observe that an anti-symplectic manifold locally always admits a parity structure. The parity structure can be viewed as a complex-like structure on the manifold. This induces an odd metric and its Levi-Civita connection, and thereby a new notion of an odd Kaehler geometry. Oversimplified, just to capture the idea, the bosonic variables are ``holomorphic'', while the fermionic variables are ``anti-holomorphic''. We find that an odd Kaehler manifold in this new ``complex'' sense has a nilpotent odd Laplacian iff it is Ricci-form-flat. The local cohomology of the odd Laplacian is derived. An odd Calabi-Yau manifold has locally a canonical volume form. We suggest that an odd Calabi-Yau manifold is the natural geometric notion to appear in covariant BV-quantization. Finally, we give a vielbein formulation of anti-symplectic manifolds.

Publié le : 1997-11-11
Classification:  Mathematical Physics,  High Energy Physics - Theory,  Mathematics - Differential Geometry

@article{9711010,
     author = {Bering, K.},
     title = {Almost Parity Structure, Connections and Vielbeins in BV Geometry},
     journal = {arXiv},
     volume = {1997},
     number = {0},
     year = {1997},
     language = {en},
     url = {http://dml.mathdoc.fr/item/9711010}
}

Bering, K. Almost Parity Structure, Connections and Vielbeins in BV Geometry. arXiv, Tome 1997 (1997) no. 0, . http://gdmltest.u-ga.fr/item/9711010/