Original Articles

Completion of Probabilistic Uniform Limit Spaces

Published in: Quaestiones Mathematicae
Volume 26 , issue 2 , 2003 , pages: 125–140

DOI: 10.2989/16073600309486049

Author(s): Harald Nusser

Keywords: PROBABILISTIC SEMIUNIFORM CONVERGENCE SPACES , (PROBABILISTIC) CONVERGENCE , SPACES , (PROBABILISTIC) UNIFORM LIMIT SPACES , (PROBABILISTIC) CAUCHY SPACES , COMPLETIONS , WYLER COMPLETION , MENGER SPACES , FUZZY UNIFORMITIES

Download full text Get new issue alerts

Abstract

In this article completions of special probabilistic semiuniform convergence spaces are considered. It turns out that every probabilitic Cauchy space under a given t-norm T (triangular norm) has a completion which, in the special case of probabilistic Cauchy spaces with reference to T=min, coincides with the KentRichardson completion for probabilistic Cauchy spaces. Moreover, a completion of probabilistic uniform limit spaces wrt T=min is given which in case of constant probabilistic uniform limit spaces coincides with the Wyler completion.

« On the Unboundedness of Control Operators for Bilinear Systems

Corrigendum to "the Lattice of Ideals Of The Nearring of Coset Preserving Functions" »