Fourier inequalities in Morrey and Campanato spaces
Abstract
We study norm inequalities for the Fourier transform, namely, equationintroduction \| f\|Xp,qλ \|f\|Y, equation where X is either a Morrey or Campanato space and Y is an appropriate function space. In the case of the Morrey space we sharpen the estimate \| f\|Mp,qλ \|f\|Ls',q, s≥ 2, 1s = 1p-λn. We also show that introduction does not hold when both X and Y are Morrey spaces. If X is a Campanato space, we prove that introduction holds for Y being the truncated Lebesgue space.
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