Mathematical Physics


A New Appraoch to Proof the Riemann Hypothesis Using New Operator

Authors: Rafik Zeraoulia

In this note we present a new approach to proof the Riemann hypothesis one of the most important open problem in pure mathematics using a new operator derived from unitary operator groups acts on Riemann-Siegal function and it uses partition function for Hamiltonian operator , The interest idea is to compute the compositional inverse of Riemann zeta function at $s=-\frac12$ such as we show that:$\zeta^{-1}(-\frac12) =\zeta(\frac12+i \beta)=0$ for some $\beta >0 $

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Submission history

[v1] 2019-08-15 14:58:34
[v2] 2019-08-15 17:26:00

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