Quantization of Kähler manifolds and the asymptotic expansion of Tian–Yau–Zelditch

An analogue of Calabi's conjecture was posed on a class of complete noncompact Kihler manifolds [5], then solved on the simplest of them, the complex n-space with n > 2 [9]. Here we prove the conjecture in its full generality, by inverting an elliptic complex Monge-Amp&e operator between suitable Fr

For a given symplectic manifold M we consider the bundle whose base is the space of Kähler structures on M, and whose fibers are the corresponding Kähler quantizations of M. We analyse the possible parallel transports in that bundle and the relation between the holonomy of some of them and the Berry

We investigate a class of operators resulting from a quantization scheme attributed to Berezin. These so-called Berezin-Toeplitz operators are defined on a Hilbert space of square-integrable holomorphic sections in a line bundle over the classical phase space. As a first goal we develop self-adjoint