Continuous prime systems satisfying N(x)=c(x-1)+1

Abstract

Hilberdink showed that there exists a constant c0>2, such that there exists a continuous prim system satisfying N(x)=c(x-1)+1 if and only if c≤ c0. Here we determine c0 numerically to be 1.25479· 10192· 1014. To do so we compute a representation for a twisted exponential function as a sum over the roots of the Riemann zeta function. We then give explicit bounds for the error obtained when restricting the occurring sum to a finite number of zeros.

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