Some properties of generalized and approximately dual frames in Hilbert spaces

Abstract

In the present paper, some sufficient and necessary conditions for two frames =(n)n and =(n)n under which they are approximately or generalized dual frames are determined depending on the properties of their analysis and synthesis operators. We also give a new characterization for approximately dual frames associated with a given frame and given operator by using of bounded operators. Among other things, we prove that if two frames =(n)n and =(n)n are close to each other, then we can find approximately dual frames ad=(adn)n and ad=(adn)n of them which are close to each other and T Uad=T Uad, where T and T (resp. Uad and Uad) are the analysis operators (resp. synthesis operators) of the frames and (resp. ad and ad), respectively. We then give some consequences on generalized dual frames. Finally, we apply these results to find some construction results for approximately dual frames for a given Gabor frame.