L2 restriction estimates from the Fourier spectrum

Abstract

The Stein--Tomas restriction theorem is an important result in Fourier restriction theory. It gives a range of q for which Lq L2 restriction estimates hold for a given measure, in terms of the Fourier and Frostman dimensions of the measure. We generalise this result by using the Fourier spectrum; a family of dimensions that interpolate between the Fourier and Sobolev dimensions for measures. This gives us a continuum of Stein--Tomas type estimates, and optimising over this continuum gives a new Lq L2 restriction theorem which often outperforms the Stein--Tomas result. We also provide results in the other direction by giving a range of q in terms of the Fourier spectrum for which Lq L2 restriction estimates fail, generalising an observation of Hambrook and aba. We illustrate our results with several examples, including the surface measure on the cone, the moment curve, and several fractal measures.

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