Faltings Serre method on three dimensional selfdual representations

Abstract

We prove that a selfdual GL3-Galois representation constructed by van Geemen and Top is isomorphic to a quadratic twist of the symmetric square of the Tate module of an elliptic curve. This is an application of our refinement of the Faltings-Serre method to 3-dimensional Galois representations with the ground field not equal to Q. The proof makes use of the Faltings-Serre method, -adic Lie algebra, and Burnside groups.