Morita equivalence and the generalized Kähler potential
2018
We solve the problem of determining the fundamental degrees of freedom underlying a generalized
Kahler structure of symplectic type. For a usual Kahler structure, it is well-known that
the geometry is determined by a complex structure, a Kahler class, and the choice of a positive
(1; 1)-form in this class, which depends locally on only a single real-valued function: the Kahler
potential. Such a description for generalized Kahler geometry has been sought since it was discovered
in 1984. We show that a generalized Kahler structure of symplectic type is determined
by a pair of holomorphic Poisson manifolds, a holomorphic symplectic Morita equivalence between
them, and the choice of a positive Lagrangian brane bisection, which depends locally on only a
single real-valued function, which we call the generalized Kahler potential. Our solution draws
upon, and specializes to, the many results in the physics literature which solve the problem under
the assumption (which we do not make) that the Poisson structures involved have constant rank.
To solve the problem we make use of, and generalize, two main tools: the rst is the notion of symplectic
Morita equivalence, developed by Weinstein and Xu to study Poisson manifolds; the second
is Donaldson's interpretation of a Kahler metric as a real Lagrangian submanifold in a deformation
of the holomorphic cotangent bundle.
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