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RE Proof of RH

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  • Jose Ramón Brox
    ... From: Bill Bouris Eta(t) function was arrived at by Reimann... and published in 1859. let F1(s) = [Eta(t)] / [(-1/2)*s] and F3(s)
    Message 1 of 1 , Aug 19, 2005
      ----- Original Message -----
      From: "Bill Bouris" <leavemsg1@...>


      Eta(t) function was arrived at by Reimann... and published in 1859.

      let F1(s) = [Eta(t)] / [(-1/2)*s] and F3(s) = [Eta(t)] / [(-1/2)(s-1)] so...

      F1(s) <= F3(s) and G(x) is Euler's gamma fctn and Z(x) is Reimann's zeta fctn... so...

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      Exactly which order in the complex numbers do you have in mind here? If it is the absolute
      value ordering, then allow me to point out that F3 can be lesser than F1. Proof: consider
      s to be a real negative number.

      Jose Brox
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