The following pages link to (Q4356062):
Displaying 49 items.
- Some properties of measures with discrete support (Q2414333) (← links)
- Substitution Delone sets with pure point spectrum are inter-model sets (Q2469963) (← links)
- Symmetrized \(\beta \)-integers (Q2474235) (← links)
- Pure point diffractive substitution Delone sets have the Meyer property (Q2482211) (← links)
- Absence of singular continuous diffraction for discrete multi-component particle models (Q2482254) (← links)
- On the index of Siegel grids and its application to the tomography of quasicrystals (Q2519781) (← links)
- Deforming Meyer sets (Q2519783) (← links)
- A point set puzzle revisited (Q2519785) (← links)
- Arithmetic Meyer sets and finite automata (Q2568439) (← links)
- Local Wiener's theorem and coherent sets of frequencies (Q2658371) (← links)
- Optimal embedding of Meyer sets into model sets (Q2790204) (← links)
- Fourier quasicrystals and Lagarias' conjecture (Q2809207) (← links)
- On embedding of repetitive Meyer multiple sets into model multiple sets (Q2827492) (← links)
- A short guide to pure point diffraction in cut-and-project sets (Q2988395) (← links)
- Parametrization of a two-dimensional quasiperiodic Rauzy tiling (Q3020547) (← links)
- Fibonacci-even numbers: Binary additive problem, distribution over progressions, and spectrum (Q3079253) (← links)
- On the Fourier Transformability of Strongly Almost Periodic Measures (Q3300097) (← links)
- Spectral properties of cubic complex Pisot units (Q3450043) (← links)
- (Q3619947) (← links)
- On weakly almost periodic measures (Q4633764) (← links)
- Dynamics on the graph of the torus parametrization (Q4643275) (← links)
- Dense Dirac combs in Euclidean space with pure point diffraction (Q4833124) (← links)
- Uniqueness theorems for Fourier quasicrystals and temperate distributions with discrete support (Q5012121) (← links)
- Delone dynamical systems and spectral convergence (Q5110226) (← links)
- Approximate Lattices and Meyer Sets in Nilpotent Lie Groups (Q5126763) (← links)
- Delone Sets and Dynamical Systems (Q5141330) (← links)
- Cut and project sets with polytopal window I: Complexity (Q5146585) (← links)
- Pure point/continuous decomposition of translation-bounded measures and diffraction (Q5207980) (← links)
- A classification of aperiodic order via spectral metrics and Jarník sets (Q5235119) (← links)
- Statistics of patterns in typical cut and project sets (Q5242535) (← links)
- Factors of Pisot tiling spaces and the Coincidence Rank Conjecture (Q5255632) (← links)
- Bohr and Besicovitch almost periodic discrete sets and quasicrystals (Q5390229) (← links)
- Beta-expansions, natural extensions and multiple tilings associated with Pisot units (Q5390239) (← links)
- Lattice substitution systems and model sets (Q5932806) (← links)
- A computer program written in Mathematica for calculating \(H_2\)-quasicrystals and their diffraction patterns (Q5938257) (← links)
- Crystallography and Riemann surfaces. (Q5944939) (← links)
- Complex Pisot numbers in algebraic number fields (Q5965046) (← links)
- ON HIGHER DIMENSIONAL ARITHMETIC PROGRESSIONS IN MEYER SETS (Q6040810) (← links)
- Fourier transformable measures with weak Meyer set support and their lift to the cut-and-project scheme (Q6052811) (← links)
- On eigenmeasures under Fourier transform (Q6082540) (← links)
- Model sets with Euclidean internal space (Q6089827) (← links)
- Characterisation of Meyer sets via the Freiman-Ruzsa theorem (Q6093380) (← links)
- Why do (weak) Meyer sets diffract? (Q6155981) (← links)
- Approximate lattices in higher-rank semi-simple groups (Q6173553) (← links)
- Tempered distributions with translation bounded measure as Fourier transform and the generalized Eberlein decomposition (Q6196786) (← links)
- Classification and statistics of cut-and-project sets (Q6582329) (← links)
- A naturally appearing family of Cantorvals (Q6606281) (← links)
- Inter-model sets in \(\mathbb{R}^d\) are model sets (Q6634390) (← links)
- On the distances between Pisot numbers generating the same number field (Q6655887) (← links)
