• Corpus ID: 2014891

MOLLIFYING THE RIEMANN ZETA-FUNCTION

@inproceedings{ConreyMOLLIFYINGTR,
  title={MOLLIFYING THE RIEMANN ZETA-FUNCTION},
  author={J. Brian Conrey}
}

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A lower bound is obtained for max |ζ(1/2+it)| ast varies over T⩽t ⩽T+Y, where (logT)1/100⩵️Y⩴T, as a function ofY( 1/100 is unimportant) where D is a positive constant.

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The Riemann zeta-function embodies both additive and multiplicative structures in a single function, making it our most important tool in the study of prime numbers. This volume studies all aspects

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HAL is a multi-disciplinary open access archive for the deposit and dissemination of scientific research documents, whether they are published or not. The documents may come from teaching and