Gabor multipliers for weighted Banach spaces on locally compact abelian groups (Q2654718)

Let \(G\) be a locally compact abelian group and \(\widehat G\) its dual group. Using a projective groups representation \(\rho\) of the unimodular group \(G\times\widehat G\) on \(L^2(G)\), the author defines the Gabor wavelet transform of a function \(f\) with respect to the window function \(g\). By these transforms, the author defines a weighted Banach space \(H^{1,\rho}_{\overline\omega}(G)\) and its dual space \(H^{1,\rho^*}_{\overline\omega}(G)\), where \(\overline\omega\) is a moderate weight function on \(G\times\widehat G\). These spaces reduce to the well-known Feichtinger algebra \(S_0(G)\) and the Banach space of the Feichtinger distribution \(S_0(G)\), respectively, for \(\overline\omega\equiv 1\). The author obtains an atomic decomposition of \(H^{1,\rho}_{\overline\omega}(G)\) and studies some properties of the Gabor multipliers on the spaces \(L^2(G)\), \(H^{1,\rho}_{\overline\omega}(G)\) and \(H^{1, \rho^*}_{\overline\omega}(G)\). Moreover, the author proves a theorem on the compactness of the Gabor multiplier operators on \(L^2(G)\) and \(H^{1,\rho}_{\overline\omega}(G)\), which reduces to an earlier result of Feichtinger for \(\overline\omega= 1\) and \(G=\mathbb{R}^n\).