Size of discriminants of periodic geodesics of the modular surface
Abstract
Pick a random matrix γ in = SL(2,Z). Denote by OK the Dedekind ring generated by its eigenvalues, and let K, γ and = Tr(γ)2-4 be the respective discriminant of the rings OK, the multiplier ring M(2,Z) Q[γ] and Z[γ]. We show that their ratios admit probability limit distributions. In particular, 42% of the elements of have a fundamental discriminant, and Z[γ] is a ring of integers with probability 32%.
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