Title: RKHS, Odzijewicz, Berezin and Fedosov-type quantizations on smooth compact manifolds

Abstract: In this article we define Odzijewicz, Berezin and Fedosov-type quantization on compact smooth manifolds. The method is as follows. We embed the smooth manifold of real dimension $n$ into ${\mathbb C}P^n$ (and in the Fedosov quantization case embed into any real $2n$ dimensional symplectic manifold). The pullback coherent states are defined in the usual way. In the Odzijewicz-type, Berezin-type quantization the Hilbert space of geometric quantization is the pullback by the embedding of the Hilbert space of geometric quantization of ${\mathbb C}P^n$. In the Berezin case, the operators that are quantized are those induced from the ambient space. The Berezin-type quantization exhibited here is a generalization of an earlier work of the author and Kohinoor Ghosh (where we had needed totally real embedding). The Fedosov-type quantization is carried out by restriction to the submanifold given by the embedding.