Determinants of Subquotients of Galois Representations Associated to Abelian Varieties

Abstract

Given an abelian variety A of dimension g over a number field K, and a prime , the n-torsion points of A give rise to a representation A, n : (K / K) 2g(/n). In particular, we get a mod- representation A, : (K / K) 2g()and an -adic representation A, : (K / K) 2g(). In this paper, we describe the possible determinants of subrepresentations (or more generally, subquotients) of these two representation for a prime number, as A varies over all g-dimensional abelian varieties. Note that it is certainly not the case that any mod- subquotient lifts to an -adic one. Nevertheless, the list of possible mod- characters turns out to be remarkably similar to the list of possible -adic characters.