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Homogeneous Fourier multipliers of Marcinkiewicz type

This 1995 paper contains a sharp version of the classical Marcinkiewicz multiplier theorem for the class of homogeneous Fourier multipliers in two dimensions; here a one-dimensional Marcinkiewicz condition is sufficient. Examples are given to show that the straightforward extension of this statement to higher dimensions does not hold. We provide appropriate versions in higher dimensions which rely on a Fefferman-Stein weighted norm inequality for a relevant Córdoba type square function. The proof of this inequality is given by an early version of an induction on scales argument. For $p<1$ we prove a multiplier theorem on product-type $H^p$-spaces.

preprint2020arXivOpen access
Anthony CarberyAndreas Seeger
math.FAmath.CA
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Anthony CarberyAndreas Seeger

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