Full Lattice Convergence on Riesz Spaces
Abstract
The full lattice convergence on a locally solid Riesz space is an abstraction of the topological, order, and relatively uniform convergences. We investigate four modifications of a full convergence on a Riesz space. The first one produces a sequential convergence . The second makes an absolute -convergence and generalizes the absolute weak convergence. The third modification makes an unbounded -convergence and generalizes various unbounded convergences recently studied in the literature. The last one is applicable whenever is a full convergence on a commutative -algebra and produces the multiplicative modification of . We study general properties of full lattice convergence with emphasis on universally complete Riesz spaces and on Archimedean -algebras. The technique and results in this paper unify and extend those which were developed and obtained in recent literature on unbounded convergences.
Cite
@article{arxiv.2004.04879,
title = {Full Lattice Convergence on Riesz Spaces},
author = {Abdullah Aydın and Eduard Emelyanov and Svetlana Gorokhova},
journal= {arXiv preprint arXiv:2004.04879},
year = {2020}
}