Nonzero values of Dirichlet L-functions in vertical arithmetic progressions
Abstract
Let L(s,) be a fixed Dirichlet L-function. Given a vertical arithmetic progression of T points on the line (s)=1/2, we show that T T of them are not zeros of L(s,). This result provides some theoretical evidence towards the conjecture that all ordinates of zeros of Dirichlet L-functions are linearly independent over the rationals. We also establish an upper bound (depending upon the progression) for the first member of the arithmetic progression that is not a zero of L(s,).
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