ω-Theorems for Quotients of Zeta-Functions at Combinations of Points

Theorem A. Let q ≥ O and r ≥ O be integers. Let s = σ + it, let ζ(s) be the Riemann zeta-function, let G(o)(s) = 1, and [Formula: see text] and let F(s) = G(q)(s)/H(r)(s). Then as t → ∞ lim sup [unk]F(1 + it)[unk]/(log log t)(q+r+1) ≥ (6/π)(2))(r+1) exp {(q + r + 1)γ}, where γ is Euler's consta...

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Bibliographic Details
Main Author:	Levinson, Norman
Format:	Artigo
Language:	Inglês
Published:	1972
Subjects:	Physical Sciences: Mathematics
Online Access:	https://ncbi.nlm.nih.gov/pmc/articles/PMC426980/ https://ncbi.nlm.nih.gov/pubmed/16592011
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ω-Theorems for Quotients of Zeta-Functions at Combinations of Points

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