Barry Brent
Published 2017-08-08Version 1
We construct variants of the Riemann zeta function with convenient properties and make conjectures about their dynamics; some of the conjectures are based on an analogy with the dynamical system of zeta. More specifically, we study the family of functions $V_z: s \mapsto \zeta(s) \exp (zs)$. We observe convergence of $V_z$ fixed points along nearly logarithmic spirals with initial points at zeta fixed points and centered upon Riemann zeros. We can approximate these spirals numerically, so they might afford a means to study the geometry of the relationship of zeta fixed points to Riemann zeros.
Comments: 23 pages, 12 figures
Correlations of eigenvalues and Riemann zeros
Triple correlation of the Riemann zeros
A new bound for the smallest $x$ with $π(x) > li(x)$
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