Comparisons between Fourier and STFT multipliers: the smoothing effect of the Short-time Fourier Transform

Abstract

We study the connection between STFT multipliers Ag1,g21 m having windows g1,g2, symbols a(x,ω)=(1 m)(x,ω)=m(ω), (x,ω)∈R2d, and the Fourier multipliers Tm2 with symbol m2 on Rd. We find sufficient and necessary conditions on symbols m,m2 and windows g1,g2 for the equality Tm2= Ag1,g21 m. For m=m2 the former equality holds only for particular choices of window functions in modulation spaces, whereas it never occurs in the realm of Lebesgue spaces. In general, the STFT multiplier Ag1,g21 m, also called localization operator, presents a smoothing effect due to the so-called two-window short-time Fourier transform which enters in the definition of Ag1,g21 m. As a by-product we prove necessary conditions for the continuity of anti-Wick operators Ag,g1 m: Lp Lq having multiplier m in weak Lr spaces. Finally, we exhibit the related results for their discrete counterpart: in this setting STFT multipliers are called Gabor multipliers whereas Fourier multiplier are better known as linear time invariant (LTI) filters.