Add to ORKGExtremal length is a conformal invariant that transfers naturally to the discrete setting, giving square tilings as a natural combinatorial analog of conformal mappings. Recent work by S. Hersonsky has explored gen-eralizing these ideas to three-dimensional cube tilings. The connections between discrete extremal length and cube tilings survive the dimension jump, but a condition called the triple intersection property is needed to generalize existence arguments. We show that this condition is too strong to realize a tiling, thus showing that discrete conformal mappings are far more limited in dimension three, mirroring the classical phenomenon. We also generalize results about discrete extremal length beyond dimension three and introduce so...
International audienceThe rhombus tilings of a simply connected domain of the Euclidean plane are kn...
Symmetric tilings are an ancient, ubiquitous, and beautiful motif in decoration. Perhaps the most fa...
The rhombus tilings of a simply connected domain of the Euclidean plane are known to form a flip-con...
AbstractLet T be a triangulation of a closed topological cube Q, and let V be the set of vertices of...
(Joint work with Phil Bowers, Florida State) The famous "Penrose" tiling is perhaps the most well kn...
In his 1993 paper, “Square Tilings with Prescribed Combinatorics”, Oded Schramm gave a remarkable o...
We study several problems in discrete geometry and extremal combinatorics. Discrete geometry studies...
A dissection of a convex d-polytope is a partition of the polytope into d-simplices whose v...
Abstract Primitives and transformations in discrete geometry, such as lines, cir-cles, hyperspheres,...
AbstractThe well-known three-distance theorem states that there are at most three distinct gaps betw...
When numbers $1,\ldots,tn$ are colored with $t$ colors (each color is used $n$ times), there exists ...
The article A "regular" pentagonal tiling of the plane by P. L. Bowers and K. Stephenson, Conform. G...
Abstract. This paper opens a new chapter in the study of planar tilings by introducing conformal til...
Piecewise constant curvature manifolds are discrete analogues of Riemannian manifolds in which edge ...
AbstractWe generalize a notion of Freudenthal by proving that each metric compactum X is the inverse...
International audienceThe rhombus tilings of a simply connected domain of the Euclidean plane are kn...
Symmetric tilings are an ancient, ubiquitous, and beautiful motif in decoration. Perhaps the most fa...
The rhombus tilings of a simply connected domain of the Euclidean plane are known to form a flip-con...
AbstractLet T be a triangulation of a closed topological cube Q, and let V be the set of vertices of...
(Joint work with Phil Bowers, Florida State) The famous "Penrose" tiling is perhaps the most well kn...
In his 1993 paper, “Square Tilings with Prescribed Combinatorics”, Oded Schramm gave a remarkable o...
We study several problems in discrete geometry and extremal combinatorics. Discrete geometry studies...
A dissection of a convex d-polytope is a partition of the polytope into d-simplices whose v...
Abstract Primitives and transformations in discrete geometry, such as lines, cir-cles, hyperspheres,...
AbstractThe well-known three-distance theorem states that there are at most three distinct gaps betw...
When numbers $1,\ldots,tn$ are colored with $t$ colors (each color is used $n$ times), there exists ...
The article A "regular" pentagonal tiling of the plane by P. L. Bowers and K. Stephenson, Conform. G...
Abstract. This paper opens a new chapter in the study of planar tilings by introducing conformal til...
Piecewise constant curvature manifolds are discrete analogues of Riemannian manifolds in which edge ...
AbstractWe generalize a notion of Freudenthal by proving that each metric compactum X is the inverse...
International audienceThe rhombus tilings of a simply connected domain of the Euclidean plane are kn...
Symmetric tilings are an ancient, ubiquitous, and beautiful motif in decoration. Perhaps the most fa...
The rhombus tilings of a simply connected domain of the Euclidean plane are known to form a flip-con...