On profiniteness and Hausdorffness of topological residuated lattices

TL;DR

This paper explores conditions for profiniteness and Hausdorffness in topological residuated lattices, providing algebraic and topological characterizations and identifying classes with non-trivial Hausdorff topologies.

Contribution

It offers new necessary and sufficient conditions for profiniteness and Hausdorffness in compact topological residuated lattices, including characterizations and classes with non-trivial topologies.

Findings

Characterization of profinite residuated lattices

Conditions for the existence of Hausdorff topologies

Identification of residuated lattices with non-trivial Hausdorff topology

Abstract

The aim of this paper is to study the profiniteness of compact topological residuated lattices and the existence of Hausdorff topological residuated lattices. Firstly, we study profinite residuated lattices and obtain sufficient and necessary conditions for profiniteness in compact topological residuated lattices. These conditions include topological and algebraic characterizations. Moreover, it order to study the existence of Hausdorf topological residuated lattices, we investigate finiteness conditions in residuated lattices. Finally, we investigate linear topological residuated lattices and give the class of residuated lattices that can be endowed with a non-trivial Hausdorff topology.