Improved Generalized Periods Estimates Over Curves on Riemannian Surfaces with Nonpositive Curvature

Abstract

We show that on compact Riemann surfaces of nonpositive curvature, the generalized periods, i.e. the -th order Fourier coefficients of eigenfunctions eλ over a closed smooth curve γ which satisfies a natural curvature condition, go to 0 at the rate of O((λ)-1/2), if 0<||/λ<1-δ, for any fixed 0<δ<1. Our result implies, for instance, the generalized periods over geodesic circles on any surfaces with nonpositive curvature would converge to zero at the rate of O((λ)-1/2). A direct corollary of our results and the QER theorem of Toth and Zelditch is that for a geodesic circle γ on a compact hyperbolic surface, the restriction eλj|γ of an orthonormal basis \eλj\ has a full density subsequence that goes to zero in weak-L2(γ). One key step of our proof is a microlocal decomposition of the measure over γ into tangential and transversal parts.