On the critical regularity of nilpotent groups acting on the interval: the metabelian case

Abstract

Let G be a torsion-free, finitely-generated, nilpotent and metabelian group. In this work we show that G embeds into the group of orientation preserving C1+α-diffeomorphisms of the compact interval, for all α< 1/k where k is the torsion-free rank of G/A and A is a maximal abelian subgroup. We show that in many situations the corresponding 1/k is critical in the sense that there is no embedding of G with higher regularity. A particularly nice family where this happens, is the family of (2n+1)-dimensional Heisenberg groups, for which we can show that the critical regularity equals 1+1/n.