The Fourier Transform of Anisotropic Hardy Spaces with Variable Exponents and Their Applications
Abstract
Let A be an expansive dilation on Rn, and p(·):Rn→(0,\,∞) be a variable exponent function satisfying the globally log-H\"older continuous condition. Let Hp(·)A( Rn) be the variable anisotropic Hardy space defined via the non-tangential grand maximal function. In this paper, the authors obtain that the Fourier transform of f∈ Hp(·)A( Rn) coincides with a continuous function F on Rn in the sense of tempered distributions. As applications, the authors further conclude a higher order convergence of the continuous function F at the origin and then give a variant of the Hardy-Littlewood inequality in the setting of anisotropic Hardy spaces with variable exponents.
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