We characterize three-dimensional spaces admitting at least six or at least seven equidistant points. In particular, we show the existence of C∞ norms on ℝ3 admitting six equidistant points, which refutes a conjecture of Lawlor and Morgan (1994, Pacific J. Math. 166, 55–83), and gives the existence of energy-minimizing cones with six regions for certain uniformly convex norms on ℝ3. On the other hand, no differentiable norm on ℝ3 admits seven equidistant points. A crucial ingredient in the proof is a classification of all three-dimensional antipodal sets. We also apply the results to the touching numbers of several three-dimensional convex bodies
AbstractThis is a survey of known results and still open problems on antipodal properties of finite ...
In the paper the Fermat-Torricelli problem is considered. The problem asks a point minimizing the su...
It has been shown that the three-circles theorem, which is also known as Titeica's or Johnson's theo...
We characterize three-dimensional spaces admitting at least six or at least seven equidistant points...
A polytope in a finite-dimensional normed space is subequilateral if the length in the norm of each ...
This paper is denoted to the problem of equilateral sets and equilateral dimension of finite-dimensi...
We indicate a few properties of equilateral sets in normed spaces, mainly with respect to some of th...
Abstract. A well-known theorem of Schütte (1963) gives a sharp lower bound for the ratio between the...
We investigate various problems related to convexity in the three spaces of constant curvature (the ...
AbstractA norm Φ on Cm×n is a c-norm if there exist norms θ and φ on Cm and Cn, respectively, such t...
Artículo de publicación ISILet S be a set of 2n points on a circle such that for each point p∈S also...
AbstractLet g(k) be the smallest integer n for which there are n planar points each of which has k o...
This work refers to ball-intersections bodies as well as covering, packing, and kissing problems rel...
Abstract. We provide a complete classification up to isomorphism of all smooth convex lattice 3-poly...
We survey problems and results from combinatorial geometry in normed spaces, concentrating on proble...
AbstractThis is a survey of known results and still open problems on antipodal properties of finite ...
In the paper the Fermat-Torricelli problem is considered. The problem asks a point minimizing the su...
It has been shown that the three-circles theorem, which is also known as Titeica's or Johnson's theo...
We characterize three-dimensional spaces admitting at least six or at least seven equidistant points...
A polytope in a finite-dimensional normed space is subequilateral if the length in the norm of each ...
This paper is denoted to the problem of equilateral sets and equilateral dimension of finite-dimensi...
We indicate a few properties of equilateral sets in normed spaces, mainly with respect to some of th...
Abstract. A well-known theorem of Schütte (1963) gives a sharp lower bound for the ratio between the...
We investigate various problems related to convexity in the three spaces of constant curvature (the ...
AbstractA norm Φ on Cm×n is a c-norm if there exist norms θ and φ on Cm and Cn, respectively, such t...
Artículo de publicación ISILet S be a set of 2n points on a circle such that for each point p∈S also...
AbstractLet g(k) be the smallest integer n for which there are n planar points each of which has k o...
This work refers to ball-intersections bodies as well as covering, packing, and kissing problems rel...
Abstract. We provide a complete classification up to isomorphism of all smooth convex lattice 3-poly...
We survey problems and results from combinatorial geometry in normed spaces, concentrating on proble...
AbstractThis is a survey of known results and still open problems on antipodal properties of finite ...
In the paper the Fermat-Torricelli problem is considered. The problem asks a point minimizing the su...
It has been shown that the three-circles theorem, which is also known as Titeica's or Johnson's theo...