Approximation of the Inverse Frame Operator and Applications to Gabor Frames

Let T denote an operator on a Hilbert space • • , and let f i ∞ i=1 be a frame for the orthogonal complement of the kernel N T . We construct a sequence of operators n of the form n • = n i=1 • g n i f i which converges to the psuedoinverse T † of T in the strong operator topology as n → ∞. The oper

We consider two problems involving Gabor frames that have recently received much attention. The first problem concerns the approximation of dual Gabor frames in L 2 (R) by finite-dimensional methods. Utilizing the duality relations for Gabor frames we derive a method to approximate the dual Gabor fr

We show the existence of a "best approximation solution" to the set of equations f, f i = a i , i ∈ I, where {f i } i∈I is a frame for a Hilbert space (H, •, • ) and {a i } i∈I ∈ l 2 (I). We derive formulas showing how the solution changes if {a i } i∈I or {f i } i∈I is perturbed. We explain why the

In Appl. Comput. Harmon. Anal. 2 (1995), 160-173, Favier and Zalik presented a multivariate version of Kadec's 1/4-theorem. But their result contains an additional condition B d (L) < 1. In this paper, we show that this condition may be deleted. In fact, we make a straightforward generalization of K