Finding well approximating lattices for a finite set of points

Abstract

In this paper we address the problem of finding well approximating lattices for a given finite set A of points in Rn. More precisely, we search for o,d1, …,dn∈ Rn such that a-o is close to =d1Z+…+dnZ for every a∈ A. First we deal with the one-dimensional case, where we show that in a sense the results are almost the best possible. These results easily extend to the multi-dimensional case where the directions of the axes are given, too. Thereafter we treat the general multi-dimensional case. Our method relies on the LLL algorithm. Finally we apply the least squares algorithm to optimize the results. We give several examples to illustrate our approach.