On integrals of eigenfunctions over geodesics
Abstract
If (M,g) is a compact Riemannian surface then the integrals of L2(M)-normalized eigenfunctions ej over geodesic segments of fixed length are uniformly bounded. Also, if (M,g) has negative curvature and γ(t) is a geodesic parameterized by arc length, the measures ej(γ(t))\, dt on tend to zero in the sense of distributions as the eigenvalue j ∞, and so integrals of eigenfunctions over periodic geodesics tend to zero as j ∞. The assumption of negative curvature is necessary for the latter result.
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