AbstractSets of efficient points in a normed space with respect to the distances to the points of a given compact set are geometrically characterized; hull and closure properties are obtained. These results are relevant to geometry of normed spaces and are mostly useful in the context of location theory
AbstractWe study the problems of the maximum numbers of unit distances, largest distances and smalle...
The purpose of this paper is to introduce and discuss the concept of best approximation and best coa...
We consider the problem of finding the set of proper minimal (proper efficient, proper Pareto optima...
AbstractSets of efficient points in a normed space with respect to the distances to the points of a ...
AbstractIn a normed spaceX, we consider objective functions which depend on the distances between a ...
Given a set of points on the plane, we study the structure of their rectilinear hull. We also consid...
In this note we present geometrical characterizations for the set of efficient, weakly efficient and...
In this paper we characterize the set of efficient points in the planar point-objective location pro...
Recently Benson proposed a definition for extending Geoffrion's concept of proper efficiency to the ...
AbstractGiven a finite set A={a1,a2,…,an} in a normed linear space X; for x∈X, let πi(x) be a permut...
AbstractIn this survey we deal with the location of hyperplanes in n-dimensional normed spaces, i.e....
135 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1984.The first part of this thesis...
We consider the constrained vector optimization problem min(C) f (x), x is an element of A, where X ...
AbstractWe consider the constrained vector optimization problem minCf(x), x∈A, where X and Y are nor...
AbstractRecently Benson proposed a definition for extending Geoffrion's concept of proper efficiency...
AbstractWe study the problems of the maximum numbers of unit distances, largest distances and smalle...
The purpose of this paper is to introduce and discuss the concept of best approximation and best coa...
We consider the problem of finding the set of proper minimal (proper efficient, proper Pareto optima...
AbstractSets of efficient points in a normed space with respect to the distances to the points of a ...
AbstractIn a normed spaceX, we consider objective functions which depend on the distances between a ...
Given a set of points on the plane, we study the structure of their rectilinear hull. We also consid...
In this note we present geometrical characterizations for the set of efficient, weakly efficient and...
In this paper we characterize the set of efficient points in the planar point-objective location pro...
Recently Benson proposed a definition for extending Geoffrion's concept of proper efficiency to the ...
AbstractGiven a finite set A={a1,a2,…,an} in a normed linear space X; for x∈X, let πi(x) be a permut...
AbstractIn this survey we deal with the location of hyperplanes in n-dimensional normed spaces, i.e....
135 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1984.The first part of this thesis...
We consider the constrained vector optimization problem min(C) f (x), x is an element of A, where X ...
AbstractWe consider the constrained vector optimization problem minCf(x), x∈A, where X and Y are nor...
AbstractRecently Benson proposed a definition for extending Geoffrion's concept of proper efficiency...
AbstractWe study the problems of the maximum numbers of unit distances, largest distances and smalle...
The purpose of this paper is to introduce and discuss the concept of best approximation and best coa...
We consider the problem of finding the set of proper minimal (proper efficient, proper Pareto optima...
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