Fourier Transform of Anisotropic Mixed-norm Hardy Spaces with Applications to Hardy-Littlewood Inequalities
Abstract
Let p∈(0,1]n be a n-dimensional vector and A a dilation. Let HAp(Rn) denote the anisotropic mixed-norm Hardy space defined via the radial maximal function. Using the known atomic characterization of HAp(Rn) and establishing a uniform estimate for corresponding atoms, the authors prove that the Fourier transform of f∈ HAp(Rn) coincides with a continuous function F on Rn in the sense of tempered distributions. Moreover, the function F can be controlled pointwisely by the product of the Hardy space norm of f and a step function with respect to the transpose matrix of A. As applications, the authors obtain a higher order of convergence for the function F at the origin, and an analogue of Hardy--Littlewood inequalities in the present setting of HAp(Rn).
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