Some aspects of positive kernel method of quantization

Abstract

We discuss various aspects of positive kernel method of quantization of the one-parameter groups τt ∈ Aut(P,) of automorphisms of a G-principal bundle P(G,π,M) with a fixed connection form on its total space P. We show that the generator F of the unitary flow Ut = eit F being the quantization of τt is realized by a generalized Kirillov-Kostant-Souriau operator whose domain consists of sections of some vector bundle over M, which are defined by suitable positive kernel. This method of quantization applied to the case when G=GL(N,C) and M is a non-compact Riemann surface leads to quantization of the arbitrary holomorphic flow τthol ∈ Aut(P,). For the above case, we present the integral decompositions of the positive kernels on P× P invariant with respect to the flows τthol in terms of spectral measure of F. These decompositions generalize the ones given by Bochner theorem for a positive kernels on C × C invariant with respect to the one-parameter groups of translations of complex plane.

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