# Unbounded topologies and uo-convergence in locally solid vector lattices

**Authors:** Mitchell A. Taylor

arXiv: 1706.01575 · 2019-03-05

## TL;DR

This paper develops a general theory of unbounded convergence in locally solid vector lattices, focusing on uo-convergence and related convergence notions, expanding understanding of convergence behaviors in these mathematical structures.

## Contribution

It introduces a unified framework for unbounded convergence, particularly uo-convergence, in locally solid vector lattices, extending previous specific cases.

## Key findings

- Established a general theory of unbounded convergence.
- Analyzed properties of uo-convergence within locally solid topologies.
- Connected unbounded convergence with existing convergence concepts.

## Abstract

Suppose $X$ is a vector lattice and there is a notion of convergence $x_{\alpha} \rightarrow x$ in $X$. Then we can speak of an "unbounded" version of this convergence by saying that $(x_{\alpha})$ unbounded converges to $x\in X$ if $\lvert x_\alpha-x\rvert \wedge u\rightarrow 0$ for every $u \in X_+$. In the literature, the unbounded versions of the norm, order and absolute weak convergence have been studied. Here we create a general theory of unbounded convergence but with a focus on uo-convergence and those convergences deriving from locally solid topologies.

## Full text

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## References

21 references — full list in the complete paper: https://tomesphere.com/paper/1706.01575/full.md

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Source: https://tomesphere.com/paper/1706.01575