q-Fock Space of q-Analytic Functions and its realization in L2(C; e-z z \,dx\,dy)
Abstract
We introduce a q-deformation of the Fock space of holomorphic functions on C, based on a geometric definition of q-analyticity. This definition is inspired by a standard construction in complex differential geometry. Within this framework, we define q-analytic monomials zqn and construct the associated q-Fock space as a Hilbert space with orthonormal basis \zqn/[n]q!]\n 0. The reproducing kernel of this space is computed explicitly, and q-position and q-momentum operators are introduced, satisfying q-deformed commutation relations. We show that the q-monomials zqn can be expanded in terms of complex Hermite polynomials, thereby providing a realization of the q-Fock space as a subspace of L2(C; e-|z|2\,dx\,dy). Finally, we define a q-Bargmann transform that maps suitable q-Hermite functions into our q-Fock space and acts as a unitary isomorphism. Our construction offers a geometric and analytic approach to q-function theory, complementing recent operator-theoretic models.
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