Some compact-like properties in non-archimedean functional analysis
Abstract
First, we define some concepts similar to the local compactoidity or the c-compactness, and study relationships between these concepts and the original ones. As a result, we find a characterization of the local compactoidity when its coefficient field is spherically complete. Moreover, from the point of view of the minimum principle, we give a necessary and sufficient condition for the c-compactness under a suitable condition. Secondly, we try a new approach to a non-complete local compactoid, which gives us a different perspective than before. Thirdly, we study the non-archimedean Goldstine theorem and Eberlein-Smulian theorem. Consequently, if the coefficient field is spherically complete, we get results completely different from the classical ones. Finally, we give a new result about the closed range theorem by using epicompactness.
Cite
@article{arxiv.2207.13476,
title = {Some compact-like properties in non-archimedean functional analysis},
author = {Kosuke Ishizuka},
journal= {arXiv preprint arXiv:2207.13476},
year = {2025}
}
Comments
20 pages