Geometry and Transcendence of the Hexponential

Abstract

The modular group PSL2(Z) acts on the upper-half plane HP with quotient the modular orbifold, uniformized by the function j HP C. We first show that second derived subgroup PSL2(Z)'' corresponds to a Z2 Z/6 Galois cover of the modular orbifold by a hexpunctured plane, uniformized by the hexponential map hexp HP C (ω0Z[j]), which is a primitive of Cη4 where ω0∈ iR and C∈ R are explicit constants and η is Dedekind eta function. We describe the values of the cusp-compactification ∂ hexp QP1 ω0 Z[j]. After defining the radial-compactification Shexp R R/(2πZ), we construct a simple section InSh R/(2πZ) S PSL2(Z)' where S ⊂ RP1 is a set of numbers whose continued fraction expansions arise from Sturmian sequences, which contains the set M of Markov quadratic irrationals as those numbers arising from periodic Sturmian sequences. We will show that the values of InSh are either Markov quadratic irrationals or transcendental. Finally we provide a continued fraction expansion for hexp, and discuss its monodromy.