The following pages link to Self-similar lattice tilings (Q5948436):
Displaying 24 items.
- DISCLIKE LATTICE REPTILES INDUCED BY EXACT POLYOMINOES (Q4701940) (← links)
- On one-dimensional self-similar tilings and $pq$-tiles (Q4787466) (← links)
- Nonnegative Radix Representations for the Orthant 𝑅ⁿ₊ (Q4875759) (← links)
- FRACTAL TILINGS FROM SUBSTITUTION TILINGS (Q4961148) (← links)
- FRACTAL REP TILES OF ℝ2 AND ℝ3 USING INTEGER MATRICES (Q5024759) (← links)
- On arithmetic progressions in non-periodic self-affine tilings (Q5095138) (← links)
- Open set condition and pseudo Hausdorff measure of self-affine IFSs (Q5112376) (← links)
- Multiscaling frame multiresolution analysis and associated wavelet frames (Q5117161) (← links)
- CONNECTEDNESS OF A CLASS OF SELF-AFFINE CARPETS (Q5122201) (← links)
- Simple tiles and attractors (Q5149929) (← links)
- On self-affine tiles whose boundary is a sphere (Q5206268) (← links)
- BOUNDARY PARAMETRIZATION AND THE TOPOLOGY OF TILES (Q5273459) (← links)
- Self-affine scaling sets in ℝ² (Q5497102) (← links)
- TOPOLOGICAL STRUCTURE OF SELF-SIMILAR SETS (Q5701549) (← links)
- A NOTE ON A SELF-SIMILAR TILING GENERATED BY THE MINIMAL PISOT NUMBER (Q5701552) (← links)
- SELF SIMILAR TILES ARISING FROM THE UNITARY NUMBER SYSTEMS IN EUCLIDEAN RINGS OF IMAGINARY QUADRATIC INTEGERS (Q5744428) (← links)
- Nonseparable, compactly supported interpolating refinable functions with arbitrary smoothness (Q5931795) (← links)
- The construction of \(r\)-regular wavelets for arbitrary dilations (Q5949117) (← links)
- Linear independence of the integer translates of compactly supported distributions and refinable vectors (Q5953358) (← links)
- Topological properties of a class of cubic Rauzy fractals (Q5964054) (← links)
- Complete characterization of polyhedral self-affine tiles (Q6050231) (← links)
- Rational matrix digit systems (Q6113036) (← links)
- On self-affine tiles that are homeomorphic to a ball (Q6139323) (← links)
- Anisotropic refinable functions and the tile B-splines (Q6657434) (← links)
