Lp measure equivalence of nilpotent groups

Abstract

We classify compactly generated locally compact groups of polynomial growth up to Lp measure equivalence (ME) for all p≤ 1. To achieve this, we combine rigidity results (previously proved for discrete groups by Bowen and Austin) with new constructions of explicit orbit equivalences between simply connected nilpotent Lie groups. In particular, we prove that for every pair of simply connected nilpotent Lie groups there is an Lp orbit equivalence for some p>0, where we can choose p>1 if and only if the groups have isomorphic asymptotic cones. We also prove analogous results for lattices in simply connected nilpotent Lie groups. This yields a strong converse of Austin's Theorem that two nilpotent groups which are L1 ME have isomorphic Carnot graded groups. We also address the much harder problem of extending this classification to Lp ME for p>1: we obtain the first rigidity results, providing examples of nilpotent groups with isomorphic Carnot graded groups (hence L1 OE) which are not Lp ME for some finite (explicit) p. For this we introduce a new technique, which consists of combining induction of cohomology and scaling limits via the use of a theorem of Cantrell. Finally, in the appendix, we extend theorems of Bowen, Austin and Cantrell on L1 ME to locally compact groups.