Add to ORKG$K$-frames as a generalization of frames were introduced by L. Gu{a}vruc{t}a to study atomic systems on Hilbert spaces which allows, in a stable way, to reconstruct elements from the range of the bounded linear operator $K$ in a Hilbert space. Recently some generalizations of this concept are introduced and some of its difference with ordinary frames are studied. In this paper, we give a new generalization of $K$-frames. After proving some characterizations of generalized $K$-frames, new results are investigated and some new perturbation results are established. Finally, we give several characterizations of $K$-duals
summary:We introduce the notion of a $g$-atomic subspace for a bounded linear operator and construct...
summary:We introduce the notion of a $g$-atomic subspace for a bounded linear operator and construct...
Controlled frames have been introduced to improve the numerical efficiency of iterative algorithms f...
The concept of g-frame is a natural extension of the frame. This article mainly discusses the relati...
The concept of frames in Hilbert spaces continues to play a very interesting role in many kinds of a...
AbstractFrames in Hilbert spaces are a redundant set of vectors which yield a representation for eac...
Firstly, we study the representation of g-frames in terms of linear combinations of simpler ones suc...
Given the g-orthonormal basis for Hilbert space H, we characterize the g-frames, normalized tight g-...
Few years ago Găvruţa gave the notions of K-frame and atomic system for a linear bounded operator ...
Few years ago Găvruţa gave the notions of K-frame and atomic system for a linear bounded operator ...
AbstractFusion frames and g-frames were considered recently as generalizations of frames in Hilbert ...
Abstract. Certain facts about frames and generalized frames (g-frames) are extended for the g-frames...
AbstractG-frames, which were considered recently as generalized frames in Hilbert spaces, have many ...
Abstract. In this note, we aim to show that several known gener-alizations of frames are equivalent ...
Let (M,µ) be a measure space, U and V be two Hilbert Spaces. In this paper, we introduce and discuss...
summary:We introduce the notion of a $g$-atomic subspace for a bounded linear operator and construct...
summary:We introduce the notion of a $g$-atomic subspace for a bounded linear operator and construct...
Controlled frames have been introduced to improve the numerical efficiency of iterative algorithms f...
The concept of g-frame is a natural extension of the frame. This article mainly discusses the relati...
The concept of frames in Hilbert spaces continues to play a very interesting role in many kinds of a...
AbstractFrames in Hilbert spaces are a redundant set of vectors which yield a representation for eac...
Firstly, we study the representation of g-frames in terms of linear combinations of simpler ones suc...
Given the g-orthonormal basis for Hilbert space H, we characterize the g-frames, normalized tight g-...
Few years ago Găvruţa gave the notions of K-frame and atomic system for a linear bounded operator ...
Few years ago Găvruţa gave the notions of K-frame and atomic system for a linear bounded operator ...
AbstractFusion frames and g-frames were considered recently as generalizations of frames in Hilbert ...
Abstract. Certain facts about frames and generalized frames (g-frames) are extended for the g-frames...
AbstractG-frames, which were considered recently as generalized frames in Hilbert spaces, have many ...
Abstract. In this note, we aim to show that several known gener-alizations of frames are equivalent ...
Let (M,µ) be a measure space, U and V be two Hilbert Spaces. In this paper, we introduce and discuss...
summary:We introduce the notion of a $g$-atomic subspace for a bounded linear operator and construct...
summary:We introduce the notion of a $g$-atomic subspace for a bounded linear operator and construct...
Controlled frames have been introduced to improve the numerical efficiency of iterative algorithms f...