A Boundedness Criterion for Singular Integral Operators of convolution type on the Fock Space

Abstract

We show that for an entire function belonging to the Fock space F2(Cn) on the complex Euclidean space Cn, the integral operator eqnarray* SF(z)=∫Cn F(w) ez ·w (z- w)\,dλ(w), \ \ \ \ \ z∈ Cn, eqnarray* is bounded on F2(Cn) if and only if there exists a function m∈ L∞(Rn) such that (z)=∫Rn m(x)e-2(x-i2 z )· (x-i2 z ) dx, \ \ \ \ \ \ z∈ Cn. Here dλ(w)= π-ne- w2dw is the Gaussian measure on Cn. With this characterization we are able to obtain some fundamental results including the normaility, the algebraic property, spectrum and compactness of this operator S. Moreover, we obtain the reducing subspaces of S. In particular, in the case n=1, we give a complete solution to an open problem proposed by K. Zhu for the Fock space F2(C) on the complex plane C (Integr. Equ. Oper. Theory 81 (2015), 451--454).