One functional property of the -function of Riemann
Abstract
We prove that if a function θ ( z )=∫1∞ π ( t )\,-Li( t )tz+1dt\,, which is holomorphic in \ Rez>1 \ holomorphically extends to some simply connected domain G⊂ \ Rez>12 \, then the ( z )-function of Riemann has no zeros in this domain, ( z ) 0\,\,\,∀ z∈ G. As a consequence, it turns out that if the function θ ( z )is holomorphic in Rez>12, then the Riemann hypothesis has a positive solution.
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