Distinct distances on hyperbolic surfaces

Abstract

For any cofinite Fuchsian group ⊂ PSL(2, R), we show that any set of N points on the hyperbolic surface 2 determines ≥ C N N distinct distances for some constant C>0 depending only on . In particular, for being any finite index subgroup of PSL(2, Z) with μ=[ PSL(2, Z): ]<∞, any set of N points on 2 determines ≥ CNμ N distinct distances for some absolute constant C>0.