The Lp restriction bounds for Neumann data on surface

Abstract

Let \uλ\ be a sequence of L2-normalized Laplacian eigenfunctions on a compact two-dimensional smooth Riemanniann manifold (M,g). We seek to get an Lp restriction bounds of the Neumann data λ-1 ∂ uλ\,γ along a unit geodesic γ. Using the T-T* argument one can transfer the problem to an estimate of the norm of a Fourier integral operator and show that such bound is O(λ-1p+32). The Van De Corput theorem (Lemma 2.1) plays the crucial role in our proof. Moreover, this upper bound is shown to be optimal.