Arithmetic monodromy actions on pro-metabelian fundamental groups of once-punctured elliptic curves

Abstract

We prove structure theorems for the moduli stack of elliptic curves equipped with G-structures, where G is a finite 2-generated metabelian group. In particular, we show that if G has exponent e, then there is a subgroup H GL2(Z/e) such that G-structures on elliptic curves E are equivalent to "congruence structures of level H". Our methods are almost entirely group theoretic. Let M denote the free profinite metabelian group of rank 2, then along the way we prove a decomposition of Out(M) as an internal semi-direct product of the subgroup of "braid-like outer automorphisms" with the subgroup of "IA" outer automorphisms which induce the identity on the abelianization. We also show a surprising result that all IA-automorphisms leave every open normal subgroup stable.