Add to ORKGRecently it was shown that there is no measurable Steinhaus set in R a set which no matter how translated and rotated, contains exactly one integer lattice point. Here, we show that this argument cannot generalize to any lattice, and attempt to describe those lattices to which it applies
When a strictly convex plane set S moves by translation, the set J of points of the integer lattice ...
AbstractStein (1990) discovered (n−1)! lattice tilings of Rn by translates of the notched n-cube whi...
AbstractWe give a common proof of several results on Steinhaus sets in Rd for d⩾2 including the fact...
Dedicated to the memory of Tom Wolff We give a short proof of the fact that there are no measurable ...
A planar set is said to have the Steinhaus property if however it is placed on $R2$, it contains exa...
A planar set is said to have the Steinhaus property if however it is placed on $R2$, it contains exa...
A point set satisfies the Steinhaus property if no matter how it is placed on a plane, it covers exa...
We study the problem of finding a function $f$ with ``small support'' that simultaneously tiles with...
We discuss problems of simultaneous tiling. This means that we have an object (set, function) which ...
Steinhaus proved that given a positive integer n, one may find a circle surrounding exactly n points...
AbstractIt is shown that any set of three lattice points in n-dimensional Euclidean space Rn tiles t...
This paper proves the existence of nonmeasurable dense sets with additional properties using combina...
Abstract. Given a positive integer n, one may find a circle on the Euclidean plane surrounding exact...
Steinhaus proved that given a positive integer n, one may find a circle surrounding exactly n points...
When a strictly convex plane set S moves by translation, the set J of points of the integer lattice ...
When a strictly convex plane set S moves by translation, the set J of points of the integer lattice ...
AbstractStein (1990) discovered (n−1)! lattice tilings of Rn by translates of the notched n-cube whi...
AbstractWe give a common proof of several results on Steinhaus sets in Rd for d⩾2 including the fact...
Dedicated to the memory of Tom Wolff We give a short proof of the fact that there are no measurable ...
A planar set is said to have the Steinhaus property if however it is placed on $R2$, it contains exa...
A planar set is said to have the Steinhaus property if however it is placed on $R2$, it contains exa...
A point set satisfies the Steinhaus property if no matter how it is placed on a plane, it covers exa...
We study the problem of finding a function $f$ with ``small support'' that simultaneously tiles with...
We discuss problems of simultaneous tiling. This means that we have an object (set, function) which ...
Steinhaus proved that given a positive integer n, one may find a circle surrounding exactly n points...
AbstractIt is shown that any set of three lattice points in n-dimensional Euclidean space Rn tiles t...
This paper proves the existence of nonmeasurable dense sets with additional properties using combina...
Abstract. Given a positive integer n, one may find a circle on the Euclidean plane surrounding exact...
Steinhaus proved that given a positive integer n, one may find a circle surrounding exactly n points...
When a strictly convex plane set S moves by translation, the set J of points of the integer lattice ...
When a strictly convex plane set S moves by translation, the set J of points of the integer lattice ...
AbstractStein (1990) discovered (n−1)! lattice tilings of Rn by translates of the notched n-cube whi...
AbstractWe give a common proof of several results on Steinhaus sets in Rd for d⩾2 including the fact...