Explicit bounds on integrals of eigenfunctions over curves in surfaces of nonpositive curvature

Abstract

Let (M,g) be a compact Riemannian surface with nonpositive sectional curvature and let γ be a closed geodesic in M. And let eλ be an L2-normalized eigenfunction of the Laplace-Beltrami operator g with -g eλ = λ2 eλ. Sogge, Xi, and Zhang showed using the Gauss-Bonnet theorem that ∫γ eλ \, ds = O((λ)-1/2), an improvement over the general O(1) bound. We show this integral enjoys the same decay for a wide variety of curves, where M has nonpositive sectional curvature. These are the curves γ whose geodesic curvature avoids, pointwise, the geodesic curvature of circles of infinite radius tangent to γ.