Showing total 2 results

1. Near continuous g-frames for Hilbert C∗-modules.

Author

Khatib, Y., Hassani, M., and Amyari, M.

Subjects

HILBERT space, LINEAR operators, NONLINEAR operators, MATHEMATICS, MAPS

Abstract

Let U be a Hilbert A-module and L(U) the set of all adjointable A-linear maps on U. Let K = {Λx ∈ L(U, Vx) : x ∈ X } and L = {Γx ∈ L(U, Vx) : x ∈ X } be two continuous g-frames for U, K is said to be similar with L if there exists an invertible operator J ∈ L(U) such that Γx = ΛxJ, for all x ∈ X . In this paper, we define the concepts of closeness and nearness between two continuous g-frames. In particular, we show that K and L are near, if and only if they are similar. [ABSTRACT FROM AUTHOR]

Published

2019

2. Measures of Noncompactness in (N̅qΔ −) Summable Difference Sequence Spaces.

Author

Malik, I. Ahmad and Jalal, T.

Subjects

MATHEMATICS, MATRIX analytic methods, LINEAR operators, MAPS, NONLINEAR operators

Abstract

In this paper we first introduce N̅qΔ − summable difference sequence spaces and prove some properties of these spaces. We then obtain the necessary and sufficient conditions for infinite matrix A to map these sequence spaces on the spaces c, c0 and l∞. Finally, the Hausdorff measure of noncompactness is then used to obtain the necessary and sufficient conditions for the compactness of the linear operators defined on these spaces. [ABSTRACT FROM AUTHOR]

Published

2019