Add to ORKGLet PR be the set of patches of radius R, modulo translation. The tiling has finite local complexity (FLC), if and only if PR is a finite set for all R. In particular R → PR is locally constant and non-decreasing. Thus there is a sequence R0 = 0 < R1 < · · · < Rn < · · · with Rn→ ∞ such that PR = Pn for Rn ≤ R < Rn+1. Inverse Limit There is a restriction map pi: Pn+1 → Pn. Then the transversal is defined by the inverse limit Ξ = lim←pi Pn Rooted Tree Since all the Pn’s are finite set, Ξ is a Cantor set. A point of Ξ is an infinite sequence ξ = (pn)∞n=0 of compatible patches, so it defines a unique tiling. This inverse limit can be represented by a rooted tre
Fibonacci numbers arise in the solution of many combinatorial problems. They count the number of bin...
We describe a tiling of the plane, motivated by architectural constructions of domes, in which the F...
Monotone variational recurrence relations arise in solid state physics, conservative lattice dynamic...
Let PR be the set of patches of radius R, modulo translation. The tiling has finite local complexity...
LetPR be the set of patches of radius R, modulo translation. The tiling has finite local complexity ...
Let A be a finite subset of ℤ2. We say A tiles ℤ2 with the translation set C, if any integer z∈ℤ2 ca...
Abstract. We propose a formalism for tilings with infinite local complexity (ILC), and especially fu...
We propose a formalism for tilings with infinite local complexity (ILC), and especially fusion tilin...
A function f 2 L 1 (R) tiles the line with a constant weight w using the discrete tile set A if P...
My main research interest is combinatorics and discrete geometry. I study tilings in this context, w...
Abstract. Let T be an aperiodic and repetitive tiling of Rd with finite local complexity. Let Ω be i...
In the 1960’s and 1970’s, mathematicians discovered geometric patterns which displayed a high degree...
The direct product of two Fibonacci tilings can be described as a genuine stone inflation rule with ...
Abstract. From the works of Rauzy and Thurston, we know how to construct (multiple) tilings of some ...
We show that the complexity of a cutting word u in a regular tiling by a polyomino Q is equal to P ...
Fibonacci numbers arise in the solution of many combinatorial problems. They count the number of bin...
We describe a tiling of the plane, motivated by architectural constructions of domes, in which the F...
Monotone variational recurrence relations arise in solid state physics, conservative lattice dynamic...
Let PR be the set of patches of radius R, modulo translation. The tiling has finite local complexity...
LetPR be the set of patches of radius R, modulo translation. The tiling has finite local complexity ...
Let A be a finite subset of ℤ2. We say A tiles ℤ2 with the translation set C, if any integer z∈ℤ2 ca...
Abstract. We propose a formalism for tilings with infinite local complexity (ILC), and especially fu...
We propose a formalism for tilings with infinite local complexity (ILC), and especially fusion tilin...
A function f 2 L 1 (R) tiles the line with a constant weight w using the discrete tile set A if P...
My main research interest is combinatorics and discrete geometry. I study tilings in this context, w...
Abstract. Let T be an aperiodic and repetitive tiling of Rd with finite local complexity. Let Ω be i...
In the 1960’s and 1970’s, mathematicians discovered geometric patterns which displayed a high degree...
The direct product of two Fibonacci tilings can be described as a genuine stone inflation rule with ...
Abstract. From the works of Rauzy and Thurston, we know how to construct (multiple) tilings of some ...
We show that the complexity of a cutting word u in a regular tiling by a polyomino Q is equal to P ...
Fibonacci numbers arise in the solution of many combinatorial problems. They count the number of bin...
We describe a tiling of the plane, motivated by architectural constructions of domes, in which the F...
Monotone variational recurrence relations arise in solid state physics, conservative lattice dynamic...