Add to ORKGWe define lattice-valued Cauchy spaces. The category of these spaces is topological over SET and cartesian closed. Special examples are lattice-valued uniform convergence spaces and probabilistic Cauchy spaces. We further define completeness and give a completion for these spaces which has the property that Cauchy continuous mappings between spaces can be extended to Cauchy-continuous mappings between their completions.Keywords: L-fuzzy convergence; L-topology; L-filter; L-limit space; L-Cauchy space; L-Cauchy filter; L-uniform convergence space; probabilistic Cauchy space; completeness; completion.Quaestiones Mathematicae 33(2010), 53–74
We study a category of lattice-valued uniform convergence spaces where the lattice is enriched by tw...
⊤-filters can be used to define ⊤-convergence spaces in the lattice-valued context. Connections betw...
ABSTRACT. In a fuzzy topology on a set X, the limit of a prefilter (i.e. a filter in the lattice [0,...
An alternative set of axioms is given for the study of lattice-valued convergence spaces. These axio...
An alternative set of axioms is given for the study of lattice-valued convergence spaces. These axio...
We define level structures for lattice-valued uniform spaces and latticevalued uniform convergence s...
[EN] In this paper we survey some concepts of convergence and Cauchyness appeared separately in the ...
A category of lattice-valued Cauchy spaces is defined, and its properties are investigated. The rela...
A complete lattice is called a frame provided meets distribute over arbitrary joins. The implication...
By dropping one of the axioms of stratified lattice-valued Cauchy space recently introduced by G. Ja...
Using a pseudo-bisymmetric enriched cl-premonoid as the underlying lattice, we examine different cat...
Abstract. The duality between “regular ” and “topological ” as convergence space proper-ties extends...
We study a generalization of a diagonal condition which classically ensures that a convergence space...
In this paper we take convergence of stratified L-filters as a primitive notion and construct in t...
A general procedure is introduced for identifying categories of Cauchy spaces which have completions...
We study a category of lattice-valued uniform convergence spaces where the lattice is enriched by tw...
⊤-filters can be used to define ⊤-convergence spaces in the lattice-valued context. Connections betw...
ABSTRACT. In a fuzzy topology on a set X, the limit of a prefilter (i.e. a filter in the lattice [0,...
An alternative set of axioms is given for the study of lattice-valued convergence spaces. These axio...
An alternative set of axioms is given for the study of lattice-valued convergence spaces. These axio...
We define level structures for lattice-valued uniform spaces and latticevalued uniform convergence s...
[EN] In this paper we survey some concepts of convergence and Cauchyness appeared separately in the ...
A category of lattice-valued Cauchy spaces is defined, and its properties are investigated. The rela...
A complete lattice is called a frame provided meets distribute over arbitrary joins. The implication...
By dropping one of the axioms of stratified lattice-valued Cauchy space recently introduced by G. Ja...
Using a pseudo-bisymmetric enriched cl-premonoid as the underlying lattice, we examine different cat...
Abstract. The duality between “regular ” and “topological ” as convergence space proper-ties extends...
We study a generalization of a diagonal condition which classically ensures that a convergence space...
In this paper we take convergence of stratified L-filters as a primitive notion and construct in t...
A general procedure is introduced for identifying categories of Cauchy spaces which have completions...
We study a category of lattice-valued uniform convergence spaces where the lattice is enriched by tw...
⊤-filters can be used to define ⊤-convergence spaces in the lattice-valued context. Connections betw...
ABSTRACT. In a fuzzy topology on a set X, the limit of a prefilter (i.e. a filter in the lattice [0,...