Noncompactness of Fourier Convolution Operators on Banach Function Spaces
Abstract
Let X(R) be a separable Banach function space such that the Hardy-Littlewood maximal operator M is bounded on X(R) and on its associate space X'(R). Suppose a is a Fourier multiplier on the space X(R). We show that the Fourier convolution operator W0(a) with symbol a is compact on the space X(R) if and only if a=0. This result implies that nontrivial Fourier convolution operators on Lebesgue spaces with Muckenhoupt weights are never compact.
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