English

Lattice uniformities inducing unbounded convergence

Functional Analysis 2022-09-21 v1

Abstract

A net (xγ)γΓ(x_\gamma)_{\gamma\in\Gamma} in a locally solid Riesz space (X,τ)(X,\tau) is said to be unbounded τ\tau-convergent to xx if xγxuτ0|x_\gamma-x|\wedge u\mathop{\overset{\tau}{\longrightarrow}} 0 for all uX+u\in X_+. We recall that there is a locally solid linear topology uτ\mathfrak{u}\tau on XX such that unbounded τ\tau-convergence coincides with uτ\mathfrak{u}\tau-convergence, and moreover, uτ\mathfrak{u}\tau is characterised as the weakest locally solid linear topology which coincides with τ\tau on all order bounded subsets. It is with this motivation that we introduce, for a uniform lattice (L,u)(L,u), the weakest lattice uniformity uu^\ast on LL that coincides with uu on all the order bounded subsets of LL. It is shown that if uu is the uniformity induced by the topology of a locally solid Riesz space (X,τ)(X,\tau), then the uu^*-topology coincides with uτ\mathfrak{u}\tau. This allows comparing the results of this paper with earlier results on unbounded τ\tau-convergence. It will be seen that despite the fact that in the setup of uniform lattices most of the machinery used in the techniques of [M. A. Taylor 2019: Unbounded topologies and uo-convergence in locally solid vector spaces, J. Math. Anal. Appl. \bf{472} no.1, 981--1000] is lacking, the concept of `unbounded convergence' well fittingly generalizes to uniform lattices. We shall also answer Questions 2.13, 3.3, 5.10 of [M. A. Taylor 2019: Unbounded topologies and uo-convergence in locally solid vector spaces, J. Math. Anal. Appl. \bf{472} no.1, 981--1000] and Question 18.51 of [M. A. Taylor 2018: Unbounded convergence in vector lattices, Thesis University of Alberta].

Keywords

Cite

@article{arxiv.2209.09831,
  title  = {Lattice uniformities inducing unbounded convergence},
  author = {Kevin Abela and Emmanuel Chetcuti and Hans Weber},
  journal= {arXiv preprint arXiv:2209.09831},
  year   = {2022}
}

Comments

19 pages

R2 v1 2026-06-28T01:45:14.585Z