AbstractThe irregularities of distribution of lattice points on spheres and on level surfaces of polynomials are measured in terms of the discrepancy with respect to caps. It is found that the discrepancy depends on diophantine properties of the direction of the cap. If the direction of the cap is diophantine, in case of the spheres, close to optimal upper bounds are found. The estimates are based on a precise description of the Fourier transform of the set of lattice points on polynomial surfaces
AbstractWe consider a generalization of Heilbronn’s triangle problem by asking, given any integers n...
The discrepancy | t P ∩ Z^d | - lambda (P) t^d is studied as a function of the real variable t>1, wh...
AbstractLetP⊂[0,1]dbe ann-point set and letw:P→[0,∞) be a weight function withw(P)=∑z∈Pw(z)=1. TheL2...
AbstractThe irregularities of distribution of lattice points on spheres and on level surfaces of pol...
AbstractPolynomial lattice point sets are polynomial versions of classical lattice point sets and am...
AbstractWe study the problem of discrepancy of finite point sets in the unit square with respect to ...
AbstractIn this paper we consider the distribution of fractional parts {ν/p}, where p is a prime les...
The spherical cap discrepancy is a widely used measure for how uniformly a sample of points on the s...
We evaluate the variance of the number of lattice points in a small randomly rotated spherical ball ...
Given any full rank lattice and a natural number N , we regard the point set given by the scaled lat...
We prove a higher-rank analogue of a well-known result of W. M. Schmidt concerning almost everywhere...
We study the irregularities of distribution on two-point homogeneous spaces. Our main result is the ...
AbstractThe L2-discrepancy measures the irregularity of the distribution of a finite point set. In t...
AbstractA theorem of Scott gives an upper bound for the normalized volume of lattice polygons with e...
We show that there is a constant $K > 0$ such that for all $N, s \in \N$, $s \le N$, the point set c...
AbstractWe consider a generalization of Heilbronn’s triangle problem by asking, given any integers n...
The discrepancy | t P ∩ Z^d | - lambda (P) t^d is studied as a function of the real variable t>1, wh...
AbstractLetP⊂[0,1]dbe ann-point set and letw:P→[0,∞) be a weight function withw(P)=∑z∈Pw(z)=1. TheL2...
AbstractThe irregularities of distribution of lattice points on spheres and on level surfaces of pol...
AbstractPolynomial lattice point sets are polynomial versions of classical lattice point sets and am...
AbstractWe study the problem of discrepancy of finite point sets in the unit square with respect to ...
AbstractIn this paper we consider the distribution of fractional parts {ν/p}, where p is a prime les...
The spherical cap discrepancy is a widely used measure for how uniformly a sample of points on the s...
We evaluate the variance of the number of lattice points in a small randomly rotated spherical ball ...
Given any full rank lattice and a natural number N , we regard the point set given by the scaled lat...
We prove a higher-rank analogue of a well-known result of W. M. Schmidt concerning almost everywhere...
We study the irregularities of distribution on two-point homogeneous spaces. Our main result is the ...
AbstractThe L2-discrepancy measures the irregularity of the distribution of a finite point set. In t...
AbstractA theorem of Scott gives an upper bound for the normalized volume of lattice polygons with e...
We show that there is a constant $K > 0$ such that for all $N, s \in \N$, $s \le N$, the point set c...
AbstractWe consider a generalization of Heilbronn’s triangle problem by asking, given any integers n...
The discrepancy | t P ∩ Z^d | - lambda (P) t^d is studied as a function of the real variable t>1, wh...
AbstractLetP⊂[0,1]dbe ann-point set and letw:P→[0,∞) be a weight function withw(P)=∑z∈Pw(z)=1. TheL2...