Weighted geodesic restrictions of arithmetic eigenfunctions

Abstract

Let X be an arithmetic hyperbolic surface, a Hecke-Maass form, a geodesic segment on X, and μ a Borel measure supported on with dimension greater than 1/2. We obtain a power saving over the local bound of Eswarathasan and Pramanik for the L2 norm of with respect to μ, which is a weighted generalization of Marshall's geodesic restriction bound and is proved by applying the method of arithmetic amplification. On a general 2-dimensional Riemannian manifold, we also obtain a Kakeya-Nikodym bound for the L2 norm of any Laplace-Beltrami eigenfunction with respect to a Borel measure supported on a geodesic segment with dimension greater than 1/2.

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