On eigenfunction restriction estimates and L4-bounds for compact surfaces with nonpositive curvature

Abstract

Let (M,g) be a two-dimensional compact boundaryless Riemannian manifold with nonpostive curvature, then we shall give improved estimates for the L2-norms of the restrictions of eigenfunctions to unit-length geodesics, compared to the general results of Burq, G\'erard and Tzvetkov burq. By earlier results of Bourgain bourgainef and the first author Sokakeya, they are equivalent to improvements of the general Lp-estimates in soggeest for n=2 and 2<p<6. The proof uses the fact that the exponential map from any point in x0∈ M is a universal covering map from Tx0M to M (the Cartan-Hadamard- von Mangolt theorem), which allows us to lift the necessary calculations up to the universal cover (, g) where g is the pullback of g via the exponential map. We then prove the main estimates by using the Hadamard parametrix for the wave equation on (, g) and the fact that the classical comparison theorem of G\"unther Gu for the volume element in spaces of nonpositive curvature gives us desirable bounds for the principal coefficient of the Hadamard parametrix, allowing us to prove our main result.