A HIDDEN SYMMETRY RELATED TO THE RIEMANN HYPOTHESIS WITH THE PRIMES INTO THE CRITICAL STRIP
2010
In this note concerning integrals involving the logarithm of the Riemann Zeta function, we extend some treatments given in previous pioneering works on the subject and introduce a more general set of Lorentz measures. We first obtain two new equivalent formulations of the Riemann Hypothesis (RH). Then with a special choice of the measure we formulate the RH as a "hidden symmetry", a global symmetry which connects the region outside the critical strip with that inside the critical strip. The Zeta function with all the primes appears as argument of the Zeta function in the critical strip. We then illustrate the treatment by means of a simple numerical experiment. The representation we obtain goes a little more in the direction to believe that RH may eventually be true.
Keywords:
- Particular values of Riemann zeta function
- Arithmetic zeta function
- Mathematical analysis
- Gauss–Kuzmin–Wirsing operator
- Mathematics
- Algebra
- Z function
- Riemann Xi function
- Prime-counting function
- Prime zeta function
- Proof of the Euler product formula for the Riemann zeta function
- Topology
- Explicit formulae
- Riemann hypothesis
- Riemann zeta function
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