Lp-boundedness of Riesz transforms on solvable extensions of Carnot groups

Abstract

Let G=N R, where N is a Carnot group and R acts on N via automorphic dilations. Homogeneous left-invariant sub-Laplacians on N and R can be lifted to G, and their sum is a left-invariant sub-Laplacian on G. We prove that the first-order Riesz transforms X -1/2 are bounded on Lp(G) for all p∈(1,∞), where X is any horizontal left-invariant vector field on G. This extends a previous result by Vallarino and the first-named author, who obtained the bound for p∈(1,2]. The proof makes use of an operator-valued spectral multiplier theorem, recently proved by the authors, and hinges on estimates for products of modified Bessel functions and their derivatives.