Upper bounds for geodesic periods over hyperbolic manifolds
arXiv:1605.02999
Abstract
We prove an upper bound for geodesic periods of Maass forms over hyperbolic manifolds. By definition, such periods are integrals of Maass forms restricted to a special geodesic cycle of the ambient manifold, against a Maass form on the cycle. Under certain restrictions, the bound will be uniform.
17 pages; revised version