# On $L^0$-convex compactness in random locally convex modules

**Authors:** Mingzhi Wu, Xiaolin Zeng, Shien Zhao

arXiv: 1901.01537 · 2022-03-24

## TL;DR

This paper investigates $L^0$-convexly compact sets in random locally convex modules, establishing their fundamental properties, equivalences with classical notions, and extending key theorems like Tychonoff, James, and Banach-Alaoglu.

## Contribution

It provides a comprehensive study of $L^0$-convex compactness, proving fundamental properties, equivalences with convex compactness, and extending classical theorems to this setting.

## Key findings

- Every $L^0$-convexly compact set is complete, closed, and has the countable concatenation property.
- $L^0$-convexly compact sets are linearly homeomorphic to weakly compact subsets of locally convex spaces.
- Established Tychonoff, James, and Banach-Alaoglu theorems for $L^0$-convex compactness.

## Abstract

For the study of some typical problems in finance and economics, \v{Z}itkovi\'{c} %[G. \v{Z}itkovi\'{c}, Convex compactness and its applications, Math. Finan. Eco., 3(1)(2010) 1--12] introduced convex compactness and gave many remarkable applications. Recently, motivated by random convex optimization and random variational inequalities, Guo, et al introduced $L^0$-convex compactness, developed the related theory of $L^0$-convex compactness in random normed modules and further applied it to backward stochastic equations. %[T.X. Guo, et al, Two fixed point theorems in complete random normed modules and their applications to backward stochastic equations, J. Math. Anal. Appl., 483(2020) 123644]. In this paper, we extensively study $L^0$-convexly compact sets in random locally convex modules so that a series of fundamental results are obtained. First, we show that every $L^0$-convexly compact set is complete (hence is also closed and has the countable concatenation property). Then, we prove that any $L^0$-convexly compact set is linearly homeomorphic to a weakly compact subset of some locally convex space, and simultaneously establish the equivalence between $L^0$-convex compactness and convex compactness for a closed $L^0$-convex set. Finally, we establish Tychonoff type, James type and Banach-Alaoglu type theorems for $L^0$-convex compactness, respectively.

## Full text

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## References

17 references — full list in the complete paper: https://tomesphere.com/paper/1901.01537/full.md

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