Quantization of Holomorphic Symplectic Manifolds: Analytic Continuation of Path Integrals and Coherent States

Abstract

We extend Berezin's quantization q:M to holomorphic symplectic manifolds, which involves replacing the state space PH with its complexification T*PH. We show that this is equivalent to replacing rankx20131 Hermitian projections with all rankx20131 projections. We furthermore allow the states to be points in the cotangent bundle of a Grassmanian. We also define a holomorphic path integral quantization as a certain idempotent in a convolution algebra and we prove that these two quantizations are equivalent. For each n>0, we construct a faithful functor from the category of finite dimensional C*x2013algebras to to the category of hyperk\"ahler manifolds and we show that our quantization recovers the original C*x2013algebra. In particular, this functor comes with a homomorphism from the commutator algebra of the C*x2013algebra to the Poisson algebra of the associated hyperk\"ahler manifold. Related to this, we show that the cotangent bundles of Grassmanians have commuting almost complex structures that are compatible with a holomorphic symplectic form.