Piecewise-linear embeddings of the space of 3D lattices into 13 for high-throughput handling of lattice parameters

Abstract

We present two methods to continuously and piecewise-linearly parametrize rank-3 lattices by vectors of 13, which provides an efficient way to judge if two sets of parameters provide nearly identical lattices within their margins of errors. Such a parametrization can be used to speed up scientific computing involving periodic structures in 3 such as crystal structures, which includes database querying, detection of duplicate entries, and structure generation via deep learning techniques. One gives a novel application of Conway's vonorms and conorms, and another is achieved through a natural extension of Ry shkov's C-type to the setting modulo 3. Voronoi vectors modulo 3 obtained in the latter approach provide an algorithm for enumerating of all potential isometries under perturbations of lattice parameters.