Behavior of Gabor frame operators on Wiener amalgam spaces (Q2818332)

The author provides the convergence of Gabor expansion to an identity operator in the operator norm as well as in the \(\text{weak}^*\) sense on the amalgam space \(W(L^p, l^q)\), \(1\leq p, q\leq \infty\), as the sampling density tends to infinity by considering the Riemannian sum \(S_{a,b, g, \gamma,}f\) of the inversion formula for the windowed Fourier transform. The convergence is shown under the condition that the window function \(g\) is in the Wiener space, \(\gamma \in L^2(\mathbb R^d),\) and satisfies \(\left <\gamma, g\right>=0\) as \((a,b)\rightarrow (0,0),\) where the numbers \(a>0\), \(b>0\) are the usual translation and modulation parameters in the Gabor expansion.NEWLINENEWLINEThe author also provides the validity of Janssen's representation and the Wexler-Raz biorthogonality condition for Gabor frame operators on \(W(L^p,l^q)\) under a mild condition on the window function.