Lp integrability of functions with Fourier support on a smooth space curve

Abstract

We prove that if f∈ Lp(Rk) with p<(k2+k+2)/2 satisfies that f is supported on a small perturbation of the moment curve in Rk, then f is identically zero. This improves the more general result of Agranovsky and Narayanan, and the exponents are sharp in all dimensions. In the process, we develop a mechanism that should lead to further progress on related problems.

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