Sharp Strichartz estimates on non-trapping asymptotically conic manifolds

Abstract

We obtain the Strichartz inequalities \| u \|Lqt Lrx([0,1] × M) ≤ C \| u(0) \|L2(M) for any smooth n-dimensional Riemannian manifold M which is asymptotically conic at infinity (with either short-range or long-range metric perturbation) and non-trapping, where u is a solution to the Schr\"odinger equation iut + 1/2 M u = 0, and 2 < q, r ≤ ∞ are admissible Strichartz exponents (2q + nr = n2). This corresponds with the estimates available for Euclidean space (except for the endpoint (q,r) = (2, 2nn-2) when n > 2). These estimates imply existence theorems for semi-linear Schr\"odinger equations on M, by adapting arguments from Cazenave and Weissler cwI and Kato kato. This result improves on our previous result in HTW, which was an L4t,x Strichartz estimate in three dimensions. It is closely related to the results of Staffilani-Tataru, Burq, Tataru, and Robbiano-Zuily, who consider the case of asymptotically flat manifolds.

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