Modular functions and resolvent problems

Abstract

The link between modular functions and algebraic functions was a driving force behind the 19th century study of both. Examples include the solutions by Hermite and Klein of the quintic via elliptic modular functions and the general sextic via level 2 hyperelliptic functions. This paper aims to apply modern arithmetic techniques to the circle of ``resolvent problems'' formulated and pursued by Klein, Hilbert and others. As one example, we prove that the essential dimension at p=2 for the symmetric groups Sn is equal to the essential dimension at 2 of certain Sn-coverings defined using moduli spaces of principally polarized abelian varieties. Our proofs use the deformation theory of abelian varieties in characteristic p, specifically Serre-Tate theory, as well as a family of remarkable mod 2 symplectic Sn-representations constructed by Jordan. As shown in an appendix by Nate Harman, the properties we need for such representations exist only in the p=2 case. In the second half of this paper we introduce the notion of -versality as a kind of generalization of Kummer theory, and we prove that many congruence covers are -versal. We use these -versality result to deduce the equivalence of Hilbert's 13th Problem (and related conjectures) with problems about congruence covers.