Divergence of separated nets with respect to displacement equivalence

Abstract

We introduce a hierachy of equivalence relations on the set of separated nets of a given Euclidean space, indexed by concave increasing functions φ (0,∞)(0,∞). Two separated nets are called φ-displacement equivalent if, roughly speaking, there is a bijection between them which, for large radii R, displaces points of norm at most R by something of order at most φ(R). We show that the spectrum of φ-displacement equivalence spans from the established notion of bounded displacement equivalence, which corresponds to bounded φ, to the indiscrete equivalence relation, coresponding to φ(R)∈ (R), in which all separated nets are equivalent. In between the two ends of this spectrum, the notions of φ-displacement equivalence are shown to be pairwise distinct with respect to the asymptotic classes of φ(R) for R∞. We further undertake a comparison of our notion of φ-displacement equivalence with previously studied relations on separated nets. Particular attention is given to the interaction of the notions of φ-displacement equivalence with that of bilipschitz equivalence.