Realizing Galois representations in abelian varieties by specialization

Abstract

We give some positive answers to the following problem: Given a field K and a continuous Galois representation :GK GLn(Q), construct an abelian variety J/K of small dimension such that is a sub-representation of the natural GK-representation on J(K) Z Q. We prove that if K is Hilbertian of characteristic different from 2, then for any sufficiently large integer g (depending on ) we can find infinitely many absolutely simple g-dimensional abelian varieties which realize . We outline also a method of twisting a given symmetric construction of curves with many rational points to instead produce curves with closed points of large degree, and in this context we give a unified treatment of constructions of Mestre--Shioda and Liu--Lorenzini. The main results are obtained by applying a natural generalization of N\'eron's Specialization Theorem.