Timo S. Hänninen, Tuomas V. Oikari
Published 2024-11-26Version 1
Let $(F_i)$ be a sequence of sets in a Banach space $X$. For what sequences does the condition $$ \limsup_{i\to \infty} \sup_{f_i\in F_i} \|Tf_i\|_Y=0 $$ hold for every Banach space $Y$ and every compact operator $T:X\to Y$? We answer this question by giving sufficient (and necessary) criteria for such sequences. We illustrate the applicability of the criteria by examples from literature and by characterizing the $L^p\to L^p$ compactness of dyadic paraproducts on general measure spaces.
The Littlewood--Paley--Rubio de Francia property of a Banach space for the case of equal intervals
Vector-valued Walsh-Paley martingales and geometry of Banach spaces
Embedding $\ell_{\infty}$ into the space of all Operators on Certain Banach Spaces
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