Toric generalized K$\ddot{a}$hler structures. I
Abstract
This is a sequel of \cite{Wang}, which provides a general formalism for this paper. We mainly investigate thoroughly a subclass of toric generalized Khler manifolds of symplectic type introduced by Boulanger in \cite{Bou}. We find torus actions on such manifolds are all \emph{strong Hamiltonian} in the sense of \cite{Wang}. For each such a manifold, we prove that besides the ordinary two complex structures associated to the biHermitian description, there is a \emph{third} canonical complex structure underlying the geometry, which makes the manifold toric Khler. We find the other generalized complex structure besides the symplectic one is always a B-transform of a generalized complex structure induced from a -holomorphic Poisson structure characterized by an anti-symmetric constant matrix. Stimulated by the above results, we introduce a \emph{generalized Delzant construction} which starts from a Delzant polytope with faces of codimension 1, the standard Khler structure of and an anti-symmetric matrix. This construction is used to produce non-abelian examples of strong Hamiltonian actions.
Cite
@article{arxiv.1810.08265,
title = {Toric generalized K$\ddot{a}$hler structures. I},
author = {Yicao Wang},
journal= {arXiv preprint arXiv:1810.08265},
year = {2018}
}
Comments
41 pages, no figures