Zeros of the derivative of a selberg zeta function
Friday 02 July 2004, 11:00-11:40
Seminar Room 1, Newton Institute
In this talk, we will study the distribution of non-trivial zeros of Selberg zeta functions on cofinite hyperbolic surfaces, in particular obtain the asymptotic formula for the zero density with bounded height, which is similar to the well-known Weyl law. Then we will relate the distribution of the zeros to the issue of bounding the multiplicity of Laplacian eigenvalues.