Hardy spaces and Riesz transforms on a Lie group of exponential growth
Abstract
Let G be the Lie group R2 R+ endowed with the Riemannian symmetric space structure. Take a distinguished basis X0,\, X1,\,X2 of left-invariant vector fields of the Lie algebra of G, and consider the Laplacian =-Σi=02Xi2 and the first-order Riesz transforms Ri=Xi-1/2, 3pt i=0,1,2. We first show that the atomic Hardy space H1 in G introduced by the authors in a previous paper does not admit a characterization in terms of the Riesz transforms Ri. It is also proved that two of these Riesz transforms are bounded from H1 to H1.
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