Toric generalized K\"ahler structures
Abstract
Given a compact symplectic toric manifold , we identify a class of -invariant generalized K\"ahler structures for which a generalisation the Abreu-Guillemin theory of toric K\"ahler metrics holds. Specifically, elements of are characterized by the data of a strictly convex function on the moment polytope associated to via the Delzant theorem, and an antisymmetric matrix . For a given , it is shown that a toric K\"ahler structure on can be explicitly deformed to a non-K\"ahler element of by adding a small multiple of . This constitutes an explicit realization of a recent unobstructedness theorem of R. Goto, where the choice of a matrix corresponds to choosing a holomorphic Poisson structure. Adapting methods from S. K. Donaldson, we compute the moment map for the action of on . The result introduces a natural notion of "generalized Hermitian scalar curvature". In dimension 4, we find an expression for this generalized Hermitian scalar curvature in terms of the underlying bi-Hermitian structure in the sense of Apostolov-Gauduchon-Grantcharov.
Cite
@article{arxiv.1509.06785,
title = {Toric generalized K\"ahler structures},
author = {Laurence Boulanger},
journal= {arXiv preprint arXiv:1509.06785},
year = {2015}
}