Fourier transform of anisotropic mixed-norm Hardy spaces

Long HUANG; Der-Chen CHANG; Dachun YANG

doi:10.1007/s11464-021-0906-9

Front. Math. China ›› 2021, Vol. 16 ›› Issue (1) : 119 -139. DOI: 10.1007/s11464-021-0906-9

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Fourier transform of anisotropic mixed-norm Hardy spaces

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Abstract

Let $a → ： = (a 1, ..., a n) ∈ [1, ∞) n, p → : = (p 1, ... p n) ∈ (0, 1] n, H a → p → (ℝ n)$ be the anisotropic mixed-norm Hardy space associated with $a →$ defined via the radial maximal function, and let f belong to the Hardy space $H a → p → (ℝ n)$ . In this article, we show that the Fourier transform $f^$ coincides with a continuous function g on $ℝ n$ in the sense of tempered distributions and, moreover, this continuous function g; multiplied by a step function associated with $a →$ ; can be pointwisely controlled by a constant multiple of the Hardy space norm of f: These proofs are achieved via the known atomic characterization of $H a → p → (ℝ n)$ and the establishment of two uniform estimates on anisotropic mixed-norm atoms. As applications, we also conclude a higher order convergence of the continuous function g at the origin. Finally, a variant of the Hardy{Littlewood inequality in the anisotropic mixed-norm Hardy space setting is also obtained. All these results are a natural generalization of the well-known corresponding conclusions of the classical Hardy spaces $H p (ℝ n)$ with $p ∈ (0, 1]$ , and are even new for isotropic mixed-norm Hardy spaces on $ℝ n$ .

Keywords

Anisotropic (mixed-norm) Hardy space / Fourier transform / Hardy-Littlewood inequality

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Long HUANG, Der-Chen CHANG, Dachun YANG. Fourier transform of anisotropic mixed-norm Hardy spaces. Front. Math. China, 2021, 16(1): 119-139 DOI:10.1007/s11464-021-0906-9

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