On the Banach–Mazur distance from $\ell_{1}^{n}$

Ankan Mishra; Debmalya Sain

doi:10.4064/cm9521-1-2025

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On the Banach–Mazur distance from $\ell_{1}^{n}$

Volume 177 / 2024

Ankan Mishra, Debmalya Sain Colloquium Mathematicum 177 (2024), 161-173 MSC: Primary 52A21, Secondary 46B20 DOI: 10.4064/cm9521-1-2025 Published online: 28 January 2025

Abstract

We study the Banach–Mazur distance of an $ n $-dimensional Banach space from $\ell_{1}^n$, and obtain a useful formula for it. We explore several applications of this distance formula. In particular, we give an explicit characterization of the operators attaining the Banach–Mazur distance between $\ell_{1}^n $ and $ \ell_{2}^n$. We also present an analytic approach to study the geometric aspects of the Banach–Mazur distance, which leads to improvements of some earlier results in this context.

Authors

Ankan MishraDepartment of Mathematics
Indian Institute of Information Technology Raichur
Raichur, Karnataka 584135, India
e-mail
Debmalya SainDepartment of Mathematics
Indian Institute of Information Technology Raichur
Raichur, Karnataka 584135, India
e-mail

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Institute of Mathematics / Publishing house / Journals and Serials / Colloquium Mathematicum / All issues

Colloquium Mathematicum

On the Banach–Mazur distance from $\ell_{1}^{n}$

Volume 177 / 2024

Abstract

Authors

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