Horizontal Fourier transform of the polyanalytic Fock kernel

Abstract

Let n,m 1 and α>0. We denote by Fα,m the m-analytic Bargmann--Segal--Fock space, i.e., the Hilbert space of all m-analytic functions defined on Cn and square integrables with respect to the Gaussian weight (-α |z|2). We study the von Neumann algebra A of bounded linear operators acting in Fα,m and commuting with all ``horizontal'' Weyl translations, i.e., Weyl unitary operators associated to the elements of Rn. The reproducing kernel of F1,m was computed by Youssfi [Polyanalytic reproducing kernels in Cn, Complex Anal. Synerg., 2021, 7, 28]. Multiplying the elements of Fα,m by an appropriate weight, we transform this space into another reproducing kernel Hilbert space whose kernel K is invariant under horizontal translations. Using the well-known Fourier connection between Laguerre and Hermite functions, we compute the Fourier transform of K in the ``horizontal direction'' and decompose it into the sum of d products of Hermite functions, with d=n+m-1n. Finally, applying the scheme proposed by Herrera-Ya\~nez, Maximenko, Ramos-Vazquez [Translation-invariant operators in reproducing kernel Hilbert spaces, Integr. Equ. Oper. Theory, 2022, 94, 31], we show that Fα,m is isometrically isomorphic to the space of vector-functions L2(Rn)d, and A is isometrically isomorphic to the algebra of matrix-functions L∞(Rn)d× d.