AbstractThe well-known three-distance theorem states that there are at most three distinct gaps between consecutive elements in the set of fractional parts of the first n multiples of any real number. We generalise this theorem to higher dimensions under a suitable formulation.The three-distance theorem can be thought of as a statement about champions in a tournament. The players in the tournament are geodesics between pairs of multiples of the given real number (modulo 1), two edges play each other if and only if they overlap, and an edge loses only against edges of shorter length that it plays against. According to the three-distance theorem, there are at most three distinct values for the lengths of undefeated edges. In the plane and in ...
AbstractA finite set X in the d-dimensional Euclidean space is called an s-distance set if the set o...
AbstractLet δ(n) denote the minimum diameter of a set of n points in the plane in which any two posi...
AbstractA point set is separated if the minimum distance between its elements is 1. We call two real...
Improving an old result of Clarkson et al., we show that the number of distinct distances determined...
Improving an old result of Clarkson et al., we show that the number of distinct distances determined...
The three distance theorem states that for any given irrational number $\alpha$ and a natural number...
AbstractA proof is given of the (known) result that, if real n-dimensional Euclidean space Rn is cov...
AbstractA subset X in k-dimensional Euclidean space Rk is called an s-distance set if there are exac...
Let p1, p2, p3 be three noncollinear points in the plane, and let P be a set of n other points in th...
AbstractA classical problem in combinatorial geometry is that of determining the minimum number f(n)...
The classical Three Gap Theorem asserts that for n ∈ N and p ∈ R, there are at most three distinct d...
AbstractIt is generally believed that the minimum number of distinct distances determined by a set o...
This thesis consists of two parts, which are separate with respect to content. The first part consid...
peer reviewedThe concept of n-distance was recently introduced to generalize the classical definitio...
AbstractMany years ago Danzer resolved an open question of Erdős by constructing a convex 9-...
AbstractA finite set X in the d-dimensional Euclidean space is called an s-distance set if the set o...
AbstractLet δ(n) denote the minimum diameter of a set of n points in the plane in which any two posi...
AbstractA point set is separated if the minimum distance between its elements is 1. We call two real...
Improving an old result of Clarkson et al., we show that the number of distinct distances determined...
Improving an old result of Clarkson et al., we show that the number of distinct distances determined...
The three distance theorem states that for any given irrational number $\alpha$ and a natural number...
AbstractA proof is given of the (known) result that, if real n-dimensional Euclidean space Rn is cov...
AbstractA subset X in k-dimensional Euclidean space Rk is called an s-distance set if there are exac...
Let p1, p2, p3 be three noncollinear points in the plane, and let P be a set of n other points in th...
AbstractA classical problem in combinatorial geometry is that of determining the minimum number f(n)...
The classical Three Gap Theorem asserts that for n ∈ N and p ∈ R, there are at most three distinct d...
AbstractIt is generally believed that the minimum number of distinct distances determined by a set o...
This thesis consists of two parts, which are separate with respect to content. The first part consid...
peer reviewedThe concept of n-distance was recently introduced to generalize the classical definitio...
AbstractMany years ago Danzer resolved an open question of Erdős by constructing a convex 9-...
AbstractA finite set X in the d-dimensional Euclidean space is called an s-distance set if the set o...
AbstractLet δ(n) denote the minimum diameter of a set of n points in the plane in which any two posi...
AbstractA point set is separated if the minimum distance between its elements is 1. We call two real...