Riesz transforms on ax+b groups

Abstract

We prove the Lp-boundedness for all p ∈ (1,∞) of the first-order Riesz transforms Xj L-1/2 associated with the Laplacian L = -Σj=0n Xj2 on the ax+b-group G = Rn R; here X0 and X1,…,Xn are left-invariant vector fields on G in the directions of the factors R and Rn respectively. This settles a question left open in previous work of Hebisch and Steger (who proved the result for p ≤ 2) and of Gaudry and Sj\"ogren (who only considered n=1=j). The main novelty here is that we can treat the case p ∈ (2,∞) and include the Riesz transform in the direction of R; an operator-valued Fourier multiplier theorem on Rn turns out to be key to this purpose. We also establish a weak type (1,1) endpoint for the adjoint Riesz transforms in the direction of Rn. By transference, our results imply the Lp-boundedness for p ∈ (1,∞) of the first-order Riesz transforms associated with the Schr\"odinger operator -∂s2 + e2s on the real line.

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