Independence of Artin L-functions
Abstract
Let K/ Q be a finite Galois extension. Let 1,…,r be r≥ 1 distinct characters of the Galois group with the associated Artin L-functions L(s,1),…, L(s,r). Let m≥ 0. We prove that the derivatives L(k)(s,j), 1≤ j≤ r, 0≤ k≤ m, are linearly independent over the field of meromorphic functions of order <1. From this it follows that the L-functions corresponding to the irreducible characters are algebraically independent over the field of meromorphic functions of order <1.
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