Notes on the Riemann Zeta-Function
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max |ζ(1/2+it)|>t0-δ
where ∈ is an arbitrary positive constant, t0 exceeds a positive constant depending on ∈ and C(∈) depends on ∈. In fact their results were very general and they could replace ζ(1/2+it) by F(σ+it) for very general Dirichlet series P(s), and prove (1) for F(σ+it). In this paper we record three theorems and indicate their proof. These are probably well-known to the experts in this field or at least within their easy reach. But the results are so interesting that they deserve to be printed.
Authors
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School of Mathematics, Tata Institute of Fundamental Research, Homi Bhabha Road, Bombay-400005 ,IN
K. Ramachandra -
School of Mathematics, Tata Institute of Fundamental Research, Homi Bhabha Road, Bombay-400005 ,INA. Sankaranarayanan
Abstract
In a recent paper [2] R. Balasubramanian and K. Ramachandra proved results likemax |ζ(1/2+it)|>t0-δ
where ∈ is an arbitrary positive constant, t0 exceeds a positive constant depending on ∈ and C(∈) depends on ∈. In fact their results were very general and they could replace ζ(1/2+it) by F(σ+it) for very general Dirichlet series P(s), and prove (1) for F(σ+it). In this paper we record three theorems and indicate their proof. These are probably well-known to the experts in this field or at least within their easy reach. But the results are so interesting that they deserve to be printed.
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Published
1991-12-01
How to Cite
Ramachandra, K., & Sankaranarayanan, A. (1991). Notes on the Riemann Zeta-Function. The Journal of the Indian Mathematical Society, 57(1-4), 67–77. Retrieved from https://www.informaticsjournals.com/index.php/jims/article/view/21900
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Copyright (c) 1991 K. Ramachandra, A. Sankaranarayanan
This work is licensed under a Creative Commons Attribution 4.0 International License.
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