Shrinking target equidistribution of horocycles in cusps

Abstract

Consider a shrinking neighborhood of a cusp of the unit tangent bundle of a noncompact hyperbolic surface of finite area, and let the neighborhood shrink into the cusp at a rate of T-1 as T → ∞. We show that a closed horocycle whose length goes to infinity or even a segment of that horocycle becomes equidistributed on the shrinking neighborhood when normalized by the rate T-1 provided that T/ → 0 and, for any δ>0, the segment remains larger than \T-1/6,(T/)1/2\(T/)-δ. We also have an effective result for a smaller range of rates of growth of T and . Finally, a number-theoretic identity involving the Euler totient function follows from our technique.

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