A finiteness theorem for mod p Galois representations over global function fields
Abstract
Let p be an odd prime number and let Fp be a fixed algebraic closure of the finite field of order p. Let K be a global function field of characteristic different from p and let GK be the absolute Galois group of K. We prove that there are only finitely many isomorphism classes of continuous geometric semisimple representations ρ:GK GLn(Fp) such that their Artin conductors are bounded. It is worth emphasizing that we do not need to assume that p does not divide n.
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