On generalized self-similarities of cut-and-project sets

Cut-and-project sets Sigma subset of R-n represent one of the types of uniformly discrete relatively dense sets. They arise by projection of a section of a higher-dimensional lattice to a suitably oriented subspace. Cut-and-project sets find application in solid state physics as mathematical models of atomic positions in quasicrystals, the description of their symmetries is therefore of high importance. We focus on the question when a linear map A on R-n is a self-similarity of a cut-and-project set Sigma, i.e. satisfies A Sigma subset of Sigma. We characterize such mappings A and provide a construction of a suitable cut-and-project set Sigma. We determine minimal dimension of a lattice which permits construction of such a set Sigma. (C) 2021 Elsevier Inc. All rights reserved.