Stein-Tomas Restriction Theorem via Spectral Measure on Metric Measure Spaces

Abstract

The Stein-Tomas restriction theorem on Euclidean space says one can meaningfully restrict f to the unit sphere of Rn provided f ∈ Lp(Rn) with 1 < p < 2. This result can be rewritten in terms of the estimates for the spectral measure of Laplacian. Guillarmou, Hassell and Sikora formulated a sufficient condition of the restriction theorem, via spectral measure, on abstract metric measure spaces. But they only proved the result in a special case. The present note aims to give a complete proof. In the end, it will be applied to the restriction theorem on asymptotically conic manifolds.