Explicit spectral gap for Hecke congruence covers of arithmetic Schottky surfaces
Abstract
Let be a Schottky subgroup of SL2(Z) and let X= H2 be the associated hyperbolic surface. Conditional on the generalized Riemann hypothesis for quadratic L-functions, we establish a uniform and explicit spectral gap for the Laplacian on the Hecke congruence covers X0(p) = 0(p) H2 of X for "almost" all primes p, provided the limit set of is thick enough.
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