On the analytic extension of Random Riemann Zeta Functions for some probabilistic models of the primes
Abstract
The first step in the formulation and study of the Riemann Hypothesis is the analytic continuation of the Riemann Zeta Function (RZF) in the full Complex Plane with a pole at s=1. In the current work, we study the analytic continuation of two random versions of RZF using, for Re s>1, the Euler representation of ZF in terms of the product of functions over primes. In the first case, we substitute in the Euler product pseudo-prime numbers from the famous Cram\'er Model. In the second case, we use pseudo-primes with local symmetries. We show that in the Cram\'er case analytic continuation is possible P-a.s. for Res>1/2, but not through the critical line Re s=1/2. In the second case, we show that the analytic continuation is possible in a larger domain. We also study for the Cram\'er pseudo-primes several problems from Additive Number Theory.
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