[EN] Using the general notion of distance function introduced in an earlier paper, a construction of the finest distance structure which induces a given quasi-uniformity is given. Moreover, when the usual defining condition xy : d(y; x) of the basic entourages is generalized to nd(y; x) n (for a fixed positive integer n), it turns out that if the value-monoid of the distance function is commutative, one gets a countably infinite family of quasi-uniformities on the underlying set. It is then shown that at least every finite system and every descending sequence of T1 quasi-uniformities which fulfil a weak symmetry condition is included in such a family. This is only possible since, in contrast to real metric spaces, the distance function...
In this chapter we give an equivalent point of view for quasi-metricstructures on a set X in terms o...
In this paper we present a theory of quasi-uniformities for frames in terms of entourage that is, sp...
We construct a new family of normalised metrics for measuring the dissimilarity of finite sets in te...
Using the general notion of distance function introduced in an earlier paper, a construction of the ...
SIGLEAvailable from TIB Hannover: RN 3109(303) / FIZ - Fachinformationszzentrum Karlsruhe / TIB - Te...
AbstractIn this paper, we present a definition of uniform continuity which applies to morphisms in t...
All graphs considered in this paper are finite, simple, undirected and connected. For graph theoreti...
Discrete partially ordered sets can be turned into distance spaces in several ways. The distance fun...
We study uniformities and quasi-uniformities (uniformities without the symmetry axiom) in the common...
International audienceWe consider uniformities associated with a variety of finite monoids V, but we...
AbstractWe continue our investigations on the lattice (q(X),⊆) of quasi-uniformities on a set X. Imp...
The properties of spaces equipped with a topology defined by a distance function are studied. The co...
A rational distance set is a subset of the plane such that the distance between any two points is a ...
We revisit the computation of entourage sections of the constant uniformity of the product of counta...
We study two metrics, the quasihyperbolic metric and the distance ratio metric of a subdomain G &...
In this chapter we give an equivalent point of view for quasi-metricstructures on a set X in terms o...
In this paper we present a theory of quasi-uniformities for frames in terms of entourage that is, sp...
We construct a new family of normalised metrics for measuring the dissimilarity of finite sets in te...
Using the general notion of distance function introduced in an earlier paper, a construction of the ...
SIGLEAvailable from TIB Hannover: RN 3109(303) / FIZ - Fachinformationszzentrum Karlsruhe / TIB - Te...
AbstractIn this paper, we present a definition of uniform continuity which applies to morphisms in t...
All graphs considered in this paper are finite, simple, undirected and connected. For graph theoreti...
Discrete partially ordered sets can be turned into distance spaces in several ways. The distance fun...
We study uniformities and quasi-uniformities (uniformities without the symmetry axiom) in the common...
International audienceWe consider uniformities associated with a variety of finite monoids V, but we...
AbstractWe continue our investigations on the lattice (q(X),⊆) of quasi-uniformities on a set X. Imp...
The properties of spaces equipped with a topology defined by a distance function are studied. The co...
A rational distance set is a subset of the plane such that the distance between any two points is a ...
We revisit the computation of entourage sections of the constant uniformity of the product of counta...
We study two metrics, the quasihyperbolic metric and the distance ratio metric of a subdomain G &...
In this chapter we give an equivalent point of view for quasi-metricstructures on a set X in terms o...
In this paper we present a theory of quasi-uniformities for frames in terms of entourage that is, sp...
We construct a new family of normalised metrics for measuring the dissimilarity of finite sets in te...