On the Fourier transform of the symmetric decreasing rearrangements

Abstract

Inspired by work of Montgomery on Fourier series and Donoho-Strak in signal processing, we investigate two families of rearrangement inequalities for the Fourier transform. More precisely, we show that the L2 behavior of a Fourier transform of a function over a small set is controlled by the L2 behavior of the Fourier transform of its symmetric decreasing rearrangement. In the L1 case, the same is true if we further assume that the function has a support of finite measure. As a byproduct, we also give a simple proof and an extension of a result of Lieb about the smoothness of a rearrangement. Finally, a straightforward application to solutions of the free Shr\"odinger equation is given.