Zeros of L-functions and large partial sums of Dirichlet coefficients
Abstract
Let L(s,π)=Σn=1∞λπ(n)n-s be an L-function that satisfies a weak form of the generalized Ramanujan conjecture. We prove that large partial sums of λπ(n) strongly repel the low-lying zeros of L(s,π) away from the critical line. Our results extend and quantitatively improve preceding work of Granville and Soundararajan.
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