Asymptotic properties of zeros of Riemann zeta function

Abstract

We try to define the sequence of zeros of the Riemann zeta function by an intrinsic property. Let (zk)k∈ N be the sequence of nontrivial zeros of ζ(s) with positive imaginary part. We write zk= 1/2+iτk (RH says that these τk are all real). Then the sequence (τk)k∈ N, satisfies the following asymptotic relation \[Σk∈N2xx2+τk2 12x2π+Σn=1∞ anxn,\,\,x +∞\] where a2n+1=2-2n-2(8-E2n), a2n=(1-2-2n+1)B2n/(4n). Are there other sequences (αk)k∈ N, of real or complex numbers enjoying this property? These problems are addressed in this note.