The Effective Ehrenpreis Conjecture

Abstract

Let M and N be two closed hyperbolic Riemann surfaces. The Ehrenpreis Conjecture (proved by Kahn-Markovic) asserts that for any ε>0 there are finite covers Mε M, and Nε N, such that the Teichmuller distance (in the suitable moduli space) between Mε and Nε is less than ε. It is natural to ask how large the degrees of these coverings need to be to achieve that the distance between Mε and Nε is less than ε. In this paper we show that there exists a constant k>0, depending only on M and N, so that the covers Mε M, and Nε N, can be chosen to have the degrees less than ε-k. We show that this bound is optimal by considering the case when M and N are arithmetic Riemann surfaces with the same invariant trace field which are not commensurable to each other.