AbstractWe give a structural description of cube tilings and unextendible cube packings of R3. We also prove that up to dimension 4 each cylinder of a cube tiling contains a column and demonstrate by an example that the latter result does not hold in dimension 5
AbstractWhen can a given finite region consisting of cells in a regular lattice (triangular, square,...
The existence of tilings of R^n by crosses, a cluster of unit cubes comprising a central one and 2n...
AbstractIt is shown that any set of three lattice points in n-dimensional Euclidean space Rn tiles t...
AbstractWe give a structural description of cube tilings and unextendible cube packings of R3. We al...
AbstractA family of translates of the unit cube [0,1)d+T={[0,1)d+t:t∈T}, T⊂Rd, is called a cube tili...
AbstractWe consider tilings and packings of Rd by integral translates of cubes [0,2[d, which are 4Zd...
AbstractWe are concerned with subsets of Rd that can be tiled with translates of the half-open unit ...
. O. H. Keller conjectured in 1930 that in any tiling of R n by unit n-cubes there exist two of t...
A cube tiling of Rd is a family of pairwise disjoint cubes [0, 1)d + T = {[0, 1)d + t: t ∈ T} such t...
AbstractStein (1990) discovered (n−1)! lattice tilings of Rn by translates of the notched n-cube whi...
AbstractGolomb (J. Combin. Theory 1 (1966) 280–296) showed that any polyomino which tiles a rectangl...
AbstractIt is impossible to pack 3-space with cubes in such a way that no two neighbouring cubes are...
AbstractWe give a set of only two tiles inEnfor eachn≥ 3; these sets of tiles admit only non-periodi...
AbstractIn this paper it is shown that 3-space cannot be filled with cubes such that neighbouring cu...
More than eighty years ago, Erdos considered sums of the side lengths of squares packed into a unit ...
AbstractWhen can a given finite region consisting of cells in a regular lattice (triangular, square,...
The existence of tilings of R^n by crosses, a cluster of unit cubes comprising a central one and 2n...
AbstractIt is shown that any set of three lattice points in n-dimensional Euclidean space Rn tiles t...
AbstractWe give a structural description of cube tilings and unextendible cube packings of R3. We al...
AbstractA family of translates of the unit cube [0,1)d+T={[0,1)d+t:t∈T}, T⊂Rd, is called a cube tili...
AbstractWe consider tilings and packings of Rd by integral translates of cubes [0,2[d, which are 4Zd...
AbstractWe are concerned with subsets of Rd that can be tiled with translates of the half-open unit ...
. O. H. Keller conjectured in 1930 that in any tiling of R n by unit n-cubes there exist two of t...
A cube tiling of Rd is a family of pairwise disjoint cubes [0, 1)d + T = {[0, 1)d + t: t ∈ T} such t...
AbstractStein (1990) discovered (n−1)! lattice tilings of Rn by translates of the notched n-cube whi...
AbstractGolomb (J. Combin. Theory 1 (1966) 280–296) showed that any polyomino which tiles a rectangl...
AbstractIt is impossible to pack 3-space with cubes in such a way that no two neighbouring cubes are...
AbstractWe give a set of only two tiles inEnfor eachn≥ 3; these sets of tiles admit only non-periodi...
AbstractIn this paper it is shown that 3-space cannot be filled with cubes such that neighbouring cu...
More than eighty years ago, Erdos considered sums of the side lengths of squares packed into a unit ...
AbstractWhen can a given finite region consisting of cells in a regular lattice (triangular, square,...
The existence of tilings of R^n by crosses, a cluster of unit cubes comprising a central one and 2n...
AbstractIt is shown that any set of three lattice points in n-dimensional Euclidean space Rn tiles t...