Sharp bounds for the intersection of nodal lines with certain curves

Abstract

Let Y be a hyperbolic surface and let φ be a Laplacian eigenfunction having eigenvalue -1/4-τ2 with τ>0. Let N(φ) be the set of nodal lines of φ. For a fixed analytic curve γ of finite length, we study the number of intersections between N(φ) and γ in terms of τ. When Y is compact and γ a geodesic circle, or when Y has finite volume and γ is a closed horocycle, we prove that γ is "good" in the sense of [TZ]. As a result, we obtain that the number of intersections between N(φ) and γ is O(τ). This bound is sharp.