English

Generalized geometry, equivariant $\bar{\partial}\partial$-lemma, and torus actions

Differential Geometry 2009-11-11 v2 High Energy Physics - Theory Mathematical Physics math.MP Symplectic Geometry

Abstract

In this paper we first consider the Hamiltonian action of a compact connected Lie group on an HH-twisted generalized complex manifold MM. Given such an action, we define generalized equivariant cohomology and generalized equivariant Dolbeault cohomology. If the generalized complex manifold MM satisfies the ˉ\bar{\partial}\partial-lemma, we prove that they are both canonically isomorphic to (S\g)GHH(M)(S\g^*)^G\otimes H_H(M), where (S\g)G(S\g^*)^G is the space of invariant polynomials over the Lie algebra \g\g of GG, and HH(M)H_H(M) is the HH-twisted cohomology of MM. Furthermore, we establish an equivariant version of the ˉ\bar{\partial}\partial-lemma, namely ˉG\bar{\partial}_G\partial-lemma, which is a direct generalization of the dGδd_G\delta-lemma for Hamiltonian symplectic manifolds with the Hard Lefschetz property. Second we consider the torus action on a compact generalized K\"ahler manifold which preserves the generalized K\"ahler structure and which is equivariantly formal. We prove a generalization of a result of Carrell and Lieberman in generalized K\"ahler geometry. We then use it to compute the generalized Hodge numbers for non-trivial examples of generalized K\"ahler structures on \Cn\C\P^n and \CPn\CP^n blown up at a fixed point.

Keywords

Cite

@article{arxiv.math/0607401,
  title  = {Generalized geometry, equivariant $\bar{\partial}\partial$-lemma, and torus actions},
  author = {Yi Lin},
  journal= {arXiv preprint arXiv:math/0607401},
  year   = {2009}
}

Comments

to appear in the Journal of Geometry and Physics, 27 pages, a few typos and small mistakes corrected, added a few more references