We study p-limited and almost p-limited sets in Banach lattices and their connections with relatively p-compact and relatively compact sets. We investigate the weak and the strong Gelfand–Phillips property of… Click to show full abstract
We study p-limited and almost p-limited sets in Banach lattices and their connections with relatively p-compact and relatively compact sets. We investigate the weak and the strong Gelfand–Phillips property of order p, as well as the p-GP property introduced by Delgado and Piñeiro, providing conditions under which these properties may coincide. Additionally, we prove that a Banach lattice E is a KB-space if and only if every almost p-limited set in E is relatively weakly compact if and only if the adjoint of every weakly compact taking values on E is disjoint p-summing.
Journal Title: Mediterranean Journal of Mathematics
Year Published: 2025
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