Assouad-Nagata dimension of locally finite groups and asymptotic cones

Abstract

In this work we study two problems about Assouad-Nagata dimension: 1) Is there a metric space of non zero Assouad-Nagata dimension such that all of its asymptotic cones are of Assouad-Nagata dimension zero? (Dydak and Higes) 2) Suppose G is a locally finite group with a proper left invariant metric dG. If AN(G, dG)>0, is AN (G, dG) infinite? (Brodskiy, Dydak and Lang) The first question is answered positively not only for general metric spaces but also for discrete groups with proper left invariant metrics. The second question has a negative solution. We show that for each n there exists a locally finite group of Assouad-Nagata dimension n. A generalization to countable groups of arbitrary asymptotic dimension is given