Pauli graphs, Riemann hypothesis, Goldbach pairs

Abstract

Let consider the Pauli group Pq=<X,Z> with unitary quantum generators X (shift) and Z (clock) acting on the vectors of the q-dimensional Hilbert space via X|s> =|s+1> and Z|s> =ωs |s>, with ω=(2iπ/q). It has been found that the number of maximal mutually commuting sets within Pq is controlled by the Dedekind psi function (q)=q Πp|q(1+1p) (with p a prime) Planat2011 and that there exists a specific inequality (q)q>eγ q, involving the Euler constant γ 0.577, that is only satisfied at specific low dimensions q ∈ A=\2,3,4,5,6,8,10,12,18,30\. The set A is closely related to the set A \1,24\ of integers that are totally Goldbach, i.e. that consist of all primes p2) is equivalent to Riemann hypothesis. Introducing the Hardy-Littlewood function R(q)=2 C2 Πp|np-1p-2 (with C2 0.660 the twin prime constant), that is used for estimating the number g(q) R(q) q2 q of Goldbach pairs, one shows that the new inequality R(Nr) Nr eγ is also equivalent to Riemann hypothesis. In this paper, these number theoretical properties are discusssed in the context of the qudit commutation structure.