Mean Staircase of the Riemann Zeros: a comment on the Lambert W function and an algebraic aspect

Details Mean Staircase of the Riemann Zeros: a comment on the Lambert W function and an algebraic aspect Mean Staircase of the Riemann Zeros: a comment on the Lambert W function and an algebraic aspect

2009-01-21

arxiv.org/abs/0901.3377v1

Mathematics

Number Theory

Scientific paper

In this note we discuss explicitly the structure of two simple set of zeros which are associated with the mean staircase emerging from the zeta function and we specify a solution using the Lambert W function. The argument of it may then be set equal to a special $N \times N$ classical matrix (for every $N$) related to the Hamiltonian of the Mehta-Dyson model. In this way we specify a function of an hermitean operator whose eigenvalues are the "trivial zeros" on the critical line. The first set of trivial zeros is defined by the relations $\tmop{Im} (\zeta ({1/2} + i \cdot t)) = 0 \wedge \tmop{Re} (\zeta ({1/2} + i \cdot t)) \neq 0$ and viceversa for the second set. (To distinguish from the usual trivial zeros $s = \rho + i \cdot t = - 2 n$, $n \geqslant 1$ integer)

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