Search

Your search keyword '"BAWEJA, DEEPIKA"' showing total 15 results
Start Over Author "BAWEJA, DEEPIKA"
15 results on '"BAWEJA, DEEPIKA"'

1. A generalised mid summability in Banach spaces

Author

Philip, Aleena and Baweja, Deepika

Subjects
Mathematics - Functional Analysis
Abstract

In this paper, we study the notion of mid summability in a general setting using the duality theory of sequence spaces. We define the vector valued sequence space $\lambda^{mid}(X)$ corresponding to a Banach space $X$ and sequence space $\lambda$. We prove that $\lambda^{mid}(\cdot)$ can be placed in a chain with the vector valued sequence spaces $\lambda^{s}(\cdot)$ and $\lambda^{w}(\cdot)$. Consequently, we define mid $\lambda$-summing operators and obtain the maximality of these operator ideals for a suitably restricted $\lambda$. Furthermore, we define a tensor norm using the vector valued sequence spaces $\lambda^{s}(\cdot)$ and $\lambda^{mid}(\cdot)$, and establish its correspondence with the operator ideal of absolutely mid $\lambda$-summing operators.

Published
2024

3. Ideals of mid p-summing operators: a tensor product approach

Author

Baweja, Deepika and Philip, Aleena

Subjects
Mathematics - Functional Analysis, 46B28, 46B45
Abstract

In this article, we study the ideals of mid $p$-summing operators. We obtain representation of these operator ideals by tensor norms. These tensor norms are defined by using a particular kind of sequential dual of the class of mid $p$-summable sequences. As a consequence, we prove a characterization of the adjoints of weakly and absolutely mid $p$-summing operators in terms of the operators that are defined by the transformation of dual spaces of certain vector-valued sequence spaces.

Published
2021

4. Characterizations of approximation properties defined by operator ideals in the predual of weighted Banach spaces of holomorphic functions

Author

Baweja, Deepika and Gupta, Manjul

Subjects
Mathematics - Functional Analysis, 46G20, 46E50, 46B28
Abstract

In this article, we show that the predual $\mathcal{G}_w(U)$ of the weighted space of holomorphic functions has the $\mathcal{I}$- approximation property if and only if $E$ has the $\mathcal{I}$- approximation property, where $\mathcal{I}$ is a suitably chosen operator ideal, and $\it{w}$ is a radial weight defined on a balanced open subset U of a Banach space $E$.

Published
2021

6. The approximation property for the predual of weighted spaces of holomorphic mappings on Banach spaces.

Author

Baweja, Deepika and Sardar, Jahir Abbas

Subjects
*HOLOMORPHIC functions, *BANACH spaces, *FUNCTION spaces, *TOPOLOGY, *FAMILIES
Abstract

AbstractIn this paper, we investigate the approximation property for the predual of the weighted space of holomorphic mappings, where is a countable family of weights defined on a balanced open subset U of a Banach space E. We introduce a locally convex topology on and show that is topologically isomorphic to for a suitably restricted family . As a consequence, certain characterizations of the approximation property for the space are proved. [ABSTRACT FROM AUTHOR]

Published
2024
Full Text
View/download PDF

14. THE BOUNDED APPROXIMATION PROPERTY FOR THE WEIGHTED SPACES OF HOLOMORPHIC MAPPINGS ON BANACH SPACES.

Author

GUPTA, MANJUL and BAWEJA, DEEPIKA

Subjects
BANACH spaces, APPROXIMATION theory, SUBSET selection, SET theory, MATHEMATICAL mappings
Abstract

In this paper, we study the bounded approximation property for the weighted space $\mathcal{HV}$(U) of holomorphic mappings defined on a balanced open subset U of a Banach space E and its predual $\mathcal{GV}$(U), where $\mathcal{V}$ is a countable family of weights. After obtaining an $\mathcal{S}$-absolute decomposition for the space $\mathcal{GV}$(U), we show that E has the bounded approximation property if and only if $\mathcal{GV}$(U) has. In case $\mathcal{V}$ consists of a single weight v, an analogous characterization for the metric approximation property for a Banach space E has been obtained in terms of the metric approximation property for the space $\mathcal{G}_v$(U). [ABSTRACT FROM PUBLISHER]

Published
2018
Full Text
View/download PDF

15. The Bounded Approximation Property for the Weighted (LB)-Spaces of Holomorphic Mappings on Banach Spaces.

Author

Gupta, Manjul and Baweja, Deepika

Subjects
*HOLOMORPHIC functions, *BANACH spaces
Abstract

In this paper, we consider the bounded approximation property for the weighted (LB)-spaces V H(E) and V H0(E) of entire functions defined corresponding to a decreasing family V of weights on a Banach space E. For a suitably restricted family V of weights, the bounded approximation property for a Banach space E has been characterized in terms of the bounded approximation property for the space V G(E), the predual of the space V H(E). [ABSTRACT FROM AUTHOR]

Published
2017
Full Text
View/download PDF

Catalog

Books, media, physical & digital resources
See catalog results