Fock spaces corresponding to positive definite linear transformations

Abstract

Suppose A is a positive real linear transformation on a finite dimensional complex inner product space V. The reproducing kernel for the Fock space of square integrable holomorphic functions on V relative to the Gaussian measure dμA(z)= A πne- Re< Az,z> dz is described in terms of the holomorphic--antiholomorphic decomposition of the linear operator A. Moreover, if A commutes with a conjugation on V, then a restriction mapping to the real vectors in V is polarized to obtain a Segal--Bargmann transform, which we also study in the Gaussian-measure setting.

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