"Comparisons between Fourier and STFT multipliers: the smoothing effect of the Short-time Fourier Transform"Cordero, ElenaThis is joint work with P.Balazs, F. Bastianoni, H.G. Feichtinger and N. Schweighofer. We study the connection between STFT multipliers $A^{\varphi_1,\varphi_2}_{1\otimes m}$ having windows $\varphi_1,\varphi_2$, symbols $a(x,\omega)=(1\otimes m) (x,\omega) =m(\omega)$, $ (x,\omega) \in\mathbb{R}^{2d}$, and the Fourier multipliers $T_{m_2}$ with symbol $m_2$ on $\mathbb{R}^{d}$. We find sufficient and necessary conditions on symbols $m,m_2$ and windows $\varphi_1,\varphi_2$ for the equality $T_{m_2}= A^{\varphi_1,\varphi_2}_{1\otimes m}$. For $m=m_2$ 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 $A^{\varphi_1,\varphi_2}_{1\otimes m}$, 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 $A^{\varphi_1,\varphi_2}_{1\otimes m}$. As a by-product we prove necessary conditions for the continuity of anti-Wick operators $A^{\varphi,\varphi}_{1\otimes m}: L^p\to L^q$ having multiplier $m$ in weak $L^r$ 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. |
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