Restriction and spectral multiplier theorems on asymptotically conic manifolds

Abstract

The classical Stein-Tomas restriction theorem is equivalent to the statement that the spectral measure dE(λ) of the square root of the Laplacian on n is bounded from Lp(n) to Lp'(n) for 1 ≤ p ≤ 2(n+1)/(n+3), where p' is the conjugate exponent to p, with operator norm scaling as λn(1/p - 1/p') - 1. We prove a geometric generalization in which the Laplacian on n is replaced by the Laplacian, plus suitable potential, on a nontrapping asymptotically conic manifold, which is the first time such a result has been proven in the variable coefficient setting. It is closely related to, but stronger than, Sogge's discrete L2 restriction theorem, which is an O(λn(1/p - 1/p') - 1) estimate on the Lp Lp' operator norm of the spectral projection for a spectral window of fixed length. From this, we deduce spectral multiplier estimates for these operators, including Bochner-Riesz summability results, which are sharp for p in the range above.