Quantitative Non-Compactness Properties of the Fourier Transform on Optimal Spaces
Abstract
We establish that the Fourier transform F: Lp(Rd) Lp',p(Rd), for d∈N and 1<p<2, is not strictly singular, thereby confirming the optimality of the source and target spaces. A~similar result is obtained for Fourier series on Lp(Tn), with sequence Lorentz spaces as the target. These findings complement known results, which state that F: Lp(Rd) Lp'(Rd) is finitely strictly singular and then also strictly singular, and provide further insight into the degrees of non-compactness of~F.
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