Boundedness criterion for integral operators on the fractional Fock-Sobolev spaces

Abstract

We provide a boundedness criterion for the integral operator S on the fractional Fock-Sobolev space Fs,2( Cn), s≥ 0, where S (introduced by Kehe Zhu) is given by eqnarray* SF(z):= ∫Cn F(w) ez ·w (z- w) dλ(w) eqnarray* with in the Fock space F2( Cn) and dλ(w): = π-n e-|w|2 dw the Gaussian measure on the complex space Cn. This extends the recent result in Cao--Li--Shen--Wick--Yan. The main approach is to develop multipliers on the fractional Hermite-Sobolev space WHs,2( Rn).

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