Embeddings between Lorentz sequence spaces are strictly but not finitely strictly singular

J. Lang; A. Nekvinda

doi:10.4064/sm220822-10-1

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Embeddings between Lorentz sequence spaces are strictly but not finitely strictly singular

Volume 272 / 2023

J. Lang, A. Nekvinda Studia Mathematica 272 (2023), 35-57 MSC: Primary 47B06; Secondary 54C25, 46E30. DOI: 10.4064/sm220822-10-1 Published online: 1 March 2023

Abstract

Given $0 \lt p,q, r \lt \infty $ and $ q \lt r\le \infty $ we consider the natural embedding $\ell _{p,q}\hookrightarrow \ell _{p,r}$ between Lorentz sequence spaces. We introduce a new method of proving that this non-compact embedding is always strictly singular but not finitely strictly singular.

Authors

J. LangDepartment of Mathematics
The Ohio State University
Columbus, OH 43210, USA
and
Department of Mathematical Analysis
Faculty of Mathematics and Physics
Charles University
186 75 Praha 8, Czech Republic
e-mail
A. NekvindaDepartment of Mathematics
Faculty of Civil Engineereng
Czech Technical University
16629 Praha 6, Czech Republic
e-mail

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Publishing house / Journals and Serials / Studia Mathematica / All issues

Studia Mathematica

Embeddings between Lorentz sequence spaces are strictly but not finitely strictly singular

Volume 272 / 2023

Abstract

Authors

Search for IMPAN publications

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