Add to ORKGWe discuss some problems of lattice tiling via Harmonic Analysis methods. We consider lattice tilings of R d by the unit cube in relation to the Minkowski Conjecture (now a theorem of Haj'os) and give a new equivalent form of Haj'os's theorem. We also consider "notched cubes" (a cube from which a reactangle has been removed from one of the corners) and show that they admit lattice tilings. This has also been been proved by S. Stein by a direct geometric method. Finally, we exhibit a new class of simple shapes that admit lattice tilings, the "extended cubes", which are unions of two axis-aligned rectangles that share a vertex and have intersection of odd codimension. In our approach we consider the Fourie...
(eng) In this paper, we introduce a generalization of a class of tilings which appear in the literat...
A uniformly distributed discrete set of points in the plane called lattices are considered. The most...
We introduce a family of planar regions, called Aztec diamonds, and study the ways in which...
We discuss some problems of lattice tiling via Harmonic Analysis methods. We consider lattice tiling...
AbstractStein (1990) discovered (n−1)! lattice tilings of Rn by translates of the notched n-cube whi...
. O. H. Keller conjectured in 1930 that in any tiling of R n by unit n-cubes there exist two of t...
The problem of counting tilings by dominoes and other dimers and finding arithmetic significance in ...
AbstractWhen can a given finite region consisting of cells in a regular lattice (triangular, square,...
Because of their self-similar nature, fractals can easily be used to generate tilings in the plane. ...
Let n ≥ 4 even and let Tn be the set of ribbon L-shaped n-ominoes. We study tiling problems for regi...
AbstractLet T be a tile made up of finitely many rectangles whose corners have rational coordinates ...
We construct a unilateral lattice tiling of $\mathbb{R}^n$ into hypercubes of two differnet side len...
We first prove that the set of domino tilings of a fixed finite figure is a distributive lattice, ev...
AbstractLet F be a simply connected figure constituted of cells of the butterfly lattice. We show th...
In this paper a way of representing an ordinary partition as a tiling with dominoes and squares is i...
(eng) In this paper, we introduce a generalization of a class of tilings which appear in the literat...
A uniformly distributed discrete set of points in the plane called lattices are considered. The most...
We introduce a family of planar regions, called Aztec diamonds, and study the ways in which...
We discuss some problems of lattice tiling via Harmonic Analysis methods. We consider lattice tiling...
AbstractStein (1990) discovered (n−1)! lattice tilings of Rn by translates of the notched n-cube whi...
. O. H. Keller conjectured in 1930 that in any tiling of R n by unit n-cubes there exist two of t...
The problem of counting tilings by dominoes and other dimers and finding arithmetic significance in ...
AbstractWhen can a given finite region consisting of cells in a regular lattice (triangular, square,...
Because of their self-similar nature, fractals can easily be used to generate tilings in the plane. ...
Let n ≥ 4 even and let Tn be the set of ribbon L-shaped n-ominoes. We study tiling problems for regi...
AbstractLet T be a tile made up of finitely many rectangles whose corners have rational coordinates ...
We construct a unilateral lattice tiling of $\mathbb{R}^n$ into hypercubes of two differnet side len...
We first prove that the set of domino tilings of a fixed finite figure is a distributive lattice, ev...
AbstractLet F be a simply connected figure constituted of cells of the butterfly lattice. We show th...
In this paper a way of representing an ordinary partition as a tiling with dominoes and squares is i...
(eng) In this paper, we introduce a generalization of a class of tilings which appear in the literat...
A uniformly distributed discrete set of points in the plane called lattices are considered. The most...
We introduce a family of planar regions, called Aztec diamonds, and study the ways in which...