Symmetric tilings are an ancient, ubiquitous, and beautiful motif in decoration. Perhaps the most famous examples are found at the Alhambra in Granada. Of course, a physical tiling on a wall or floor ends at the corners of the room. This is unfortunate; in our mind the tiling goes on forever. This raises the question of how we can capture an infinite tiling in a finite space
AbstractWe investigate the problem of producing symmetric tilings by programs in a uniform way. By t...
Extremal length is a conformal invariant that transfers naturally to the discrete setting, giving sq...
AbstractThe definitions and lattice hierarchy previously established for tiling regions with individ...
Abstract. This paper opens a new chapter in the study of planar tilings by introducing conformal til...
(Joint work with Phil Bowers, Florida State) The famous "Penrose" tiling is perhaps the most well kn...
Abstract. This paper studies properties of tilings of the plane by parallelograms. In particular it ...
A tiling is a covering of the plane with non-overlapping figures that have no holes between them. Fo...
Aperiodic tilings are interesting to mathematicians and scientists for both theoretical and practica...
A method for generating aperiodic tilings with five fold symmetry is discussed here. Basic patterns ...
Dolbilin NP, Dress A, Huson DH. Two finiteness theorems for periodic tilings of d-dimensional euclid...
Abstract. We call “flippable tilings ” of a constant curvature surface a tiling by “black ” and “whi...
A checkerboard, a beehive, a brick wall and a mud flat dried in the sun all have something in common...
In the 1960’s and 1970’s, mathematicians discovered geometric patterns which displayed a high degree...
AbstractQuasiperiodic tilings are those tilings in which finite patterns appear regularly in the pla...
Ammann bars are formed by segments (decorations) on the tiles of a tiling such that forming straight...
AbstractWe investigate the problem of producing symmetric tilings by programs in a uniform way. By t...
Extremal length is a conformal invariant that transfers naturally to the discrete setting, giving sq...
AbstractThe definitions and lattice hierarchy previously established for tiling regions with individ...
Abstract. This paper opens a new chapter in the study of planar tilings by introducing conformal til...
(Joint work with Phil Bowers, Florida State) The famous "Penrose" tiling is perhaps the most well kn...
Abstract. This paper studies properties of tilings of the plane by parallelograms. In particular it ...
A tiling is a covering of the plane with non-overlapping figures that have no holes between them. Fo...
Aperiodic tilings are interesting to mathematicians and scientists for both theoretical and practica...
A method for generating aperiodic tilings with five fold symmetry is discussed here. Basic patterns ...
Dolbilin NP, Dress A, Huson DH. Two finiteness theorems for periodic tilings of d-dimensional euclid...
Abstract. We call “flippable tilings ” of a constant curvature surface a tiling by “black ” and “whi...
A checkerboard, a beehive, a brick wall and a mud flat dried in the sun all have something in common...
In the 1960’s and 1970’s, mathematicians discovered geometric patterns which displayed a high degree...
AbstractQuasiperiodic tilings are those tilings in which finite patterns appear regularly in the pla...
Ammann bars are formed by segments (decorations) on the tiles of a tiling such that forming straight...
AbstractWe investigate the problem of producing symmetric tilings by programs in a uniform way. By t...
Extremal length is a conformal invariant that transfers naturally to the discrete setting, giving sq...
AbstractThe definitions and lattice hierarchy previously established for tiling regions with individ...