Sobolev algebras on nonunimodular Lie groups

Abstract

Let G be a noncompact connected Lie group and be the right Haar measure of G. Let X1,...,Xq be a family of left invariant vector fields which satisfy H\"ormander's condition, and let =-Σi=1qXi2 be the corresponding subLaplacian. For 1≤ p<∞ and α≥ 0 we define the Sobolev space Lpα(G)=f in Lp(): α/2f∈ Lp() , endowed with the norm \|f\|α,p=\|f\|p+\|α/2f\|p, where we denote by \|f\|p the norm of f in Lp(). In this paper we show that for all α≥ 0 and p∈ (1,∞), the space L∞ Lpα(G) is an algebra under pointwise product. Such result was proved by T. Coulhon, E. Russ and V. Tardivel-Nachef in the case when G is unimodular. We shall prove it on Lie groups, thus extending their result to the nonunimodular case. In order to prove our main result, we need to study the boundedness of local Riesz transforms RcJ=XJ(cI+)-m/2, where c>0, XJ=Xj1...Xjm and j ∈\1,…,q\ for =1,...,m. We show that if c is sufficiently large, the Riesz transform RcJ is bounded on Lp() for every p∈ (1,∞), and prove also appropriate endpoint results involving Hardy and BMO spaces.