Lattice Substitution Systems and Model Sets
Abstract
The paper studies ways in which the sets of a partition of a lattice in n become regular model sets. The main theorem gives equivalent conditions which assure that a matrix substitution system on a lattice in n gives rise to regular model sets (based on p-adic-like internal spaces), and hence to pure point diffractive sets. The methods developed here are used to show that the n-dimensional chair tiling and the sphinx tiling are pure point diffractive.
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