Shadow of operators on frames
Citation
Chugh, R., Singh, M. & Vashisht, L. K. (2015). Shadow of operators on frames. TWMS Journal of Applied and Engineering Mathematics, 5(1), 132-144.Abstract
Aldroubi introduced two methods for generating frames of a Hilbert space H. In one of his method, one approach is to construct frames for H which are images of a given frame for H under T ? B (H, H), a collection of all bounded linear operator on H. The other method uses bounded linear operator on ` 2 to generate frames of H. In this paper, we discuss construction of the retro Banach frames in Hilbert spaces which are images of given frames under bounded linear operators on Hilbert spaces. It is proved that the compact operators generated by a certain type of a retro Banach frame can construct a retro Banach frame for the underlying space. Finally, we discuss a linear block associated with a Schauder frame in Banach spaces.
Volume
5Issue
1URI
http://belgelik.isikun.edu.tr/xmlui/handle/iubelgelik/2556http://jaem.isikun.edu.tr/web/index.php/archive/89-vol5no1/209
Collections
The following license files are associated with this item:
Related items
Showing items related by title, author, creator and subject.
-
Continuous K-g-fusion frames in Hilbert spaces
Alizadeh, Esmaeil; Rahimi, Asghar; Osgooei, Elnaz (Işık University Press, 2021)This paper aims at introducing the concept of c-K-g-fusion frames, which are generalizations of K-g-fusion frames, proving some new results on c-K-g-fusion frames in Hilbert spaces, defining duality of c-K-g-fusion frames ... -
Stability of dual controlled g-fusion frames in Hilbert spaces
Ghosh, Prasenjit; Samanta, Tapas Kumar (Işık University Press, 2024-01)Some properties of controlled K-g-fusion frame have been discussed. Characterizations of controlled K-g-fusion frame are being presented.We also establish a relationship between quotient operator and controlled K-g-fusion ... -
On ?-schauder frames
Vashisht, Lalit Kumar (Işık University Press, 2012-03-11)In this short note we introduce and study a particular type of Schauder frames, namely, ?-Schauder frames.