Sobolev algebras on Lie groups and noncommutative geometry

Abstract

We show that there exists a quantum compact metric space which underlies the setting of each Sobolev algebra associated to a subelliptic Laplacian =-(X12+·s+Xm2) on a compact connected Lie group G if p is large enough, more precisely under the (sharp) condition p > dα where d is the local dimension of (G,X) and where 0 < α ≤ 1. We also provide locally compact variants of this result and generalizations for real second order subelliptic operators. We also introduce a compact spectral triple (=noncommutative manifold) canonically associated to each subelliptic Laplacian on a compact group. In addition, we show that its spectral dimension is equal to the local dimension of (G,X). Finally, we prove that the Connes spectral pseudo-metric allows us to recover the Carnot-Carath\'eodory distance.