A characterization of \(L\)-dual frames and \(L\)-dual Riesz bases (Q1758771)

A sequence \((f_n ){}_{n \in \mathbb N}\) in \(L^2 (G)\) is said to be an \(L\)-frame if there exist \(0 < A, B < \infty\) such that, for every \(f \in L^2 (G)\), \[ A \| f\|{}^{2}_{L} ({\dot {x}}) \leq \sum_{n \in \mathbb N}|[ f, f_n ]_{ L}({\dot{x}})|^2 \leq B \| f\|{}^2_L ({\dot{x}}), \] for a.e. \(\dot{x}\in G/L\), where \[ [f, f_n ]_{L} (\dot {x}) =\sum_{k \in L} f \overline{f}_n (xk^{ -1 }), \] and \(\| f\|_{ L} (\dot{x}) = ([f, f ]_{L} (\dot{x}))^{1/2}\). In this paper, a characterization of \(L\)-dual frames and \(L\)-dual Riesz bases on \(L^2 (G)\) is given, where \(G\) is a locally compact abelian group and \(L\) is a uniform lattice in \(G\).