Singular integrals and Hardy type spaces for the inverse Gauss measure
Abstract
Let γ-1 be the absolutely continuous measure on Rn whose density is the reciprocal of a Gaussian and consider the natural weighted Laplacian A on L2(γ-1). In this paper, we prove boundedness and unboundedness results for the purely imaginary powers and the first order Riesz transforms associated with the translated operators A+λ I, λ≥0, from certain new Hardy-type spaces adapted to γ-1 to L1(γ-1). We also investigate the weak type (1,1) of these operators.
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