Fourier Transform of Variable Anisotropic Hardy Spaces with Applications to Hardy-Littlewood Inequalities

Abstract

Let p(·):\ Rn(0,1] be a variable exponent function satisfying the globally log-H\"older continuous condition and A a general expansive matrix on Rn. Let HAp(·)(Rn) be the variable anisotropic Hardy space associated with A defined via the radial maximal function. In this article, via the known atomic characterization of HAp(·)(Rn) and establishing two useful estimates on anisotropic variable atoms, the author shows that the Fourier transform f of f∈ HAp(·)(Rn) coincides with a continuous function F in the sense of tempered distributions, and F satisfies a pointwise inequality which contains a step function with respect to A as well as the Hardy space norm of f. As applications, the author also obtains a higher order convergence of the continuous function F at the origin. Finally, an analogue of the Hardy--Littlewood inequality in the variable anisotropic Hardy space setting is also presented. All these results are new even in the classical isotropic setting.

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