Inner product of eigenfunctions over curves and generalized periods for compact Riemannian surfaces

Abstract

We show that for a smooth closed curve γ on a compact Riemannian surface without boundary, the inner product of two eigenfunctions eλ and eμ restricted to γ, |∫ eλeμ\,ds|, is bounded by \λ12,μ12\. Furthermore, given 0<c<1, if 0<μ<cλ, we prove that ∫ eλeμ\,ds=O(μ14), which is sharp on the sphere S2. These bounds unify the period integral estimates and the L2-restriction estimates in an explicit way. Using a similar argument, we also show that the -th order Fourier coefficient of eλ over γ is uniformly bounded if 0<<cλ, which generalizes a result of Reznikov for compact hyperbolic surfaces, and is sharp on both S2 and the flat torus T2. Moreover, we show that the analogs of our results also hold in higher dimensions for the inner product of eigenfunctions over hypersurfaces.