A comparison of automorphic and Artin L-series of GL ( 2 )-type agreeing at degree one primes

@inproceedings{Martin2015ACO,
  title={A comparison of automorphic and Artin L-series of GL ( 2 )-type agreeing at degree one primes},
  author={Kimball Martin and Dinakar Ramakrishnan},
  year={2015}
}
Let F be a number field and ρ an irreducible Galois representation of Artin type, i.e., ρ is a continuous C-representation of the absolute Galois group ΓF . Suppose π is a cuspidal automorphic representation of GLn(AF ) such that the L-functions L(s, ρ) and L(s, π) agree outside a set S of primes. (Here, these L-functions denote Euler products over just the… CONTINUE READING