From BCZ map to a discretized analog of the RH
Yiming Li
TL;DR
This paper explores the BCZ map's properties, constructs a moduli space for its excursions, and introduces a discretized analog of the Riemann hypothesis based on dynamical systems and L1-average estimates.
Contribution
It defines a new moduli space related to the BCZ map and formulates a stronger, discretized analog of the Riemann hypothesis using dynamical and cocycle analysis.
Findings
Properties of the BCZ map are characterized.
A moduli space for BCZ excursions is constructed.
A stronger, discretized analog of the Riemann hypothesis is established.
Abstract
We investigate the properties of the BCZ map. Based on our findings, we define the moduli space associated with its excursions. Subsequently, we utilize the framework we build to establish a discretized analog of the Riemann hypothesis (RH) that holds in a stronger sense from a dynamical perspective. The analog is founded upon a reformulation of the RH, specifically in terms of estimates of L1-averages of BCZ cocycle along periodic orbits of the BCZ map. The primary tool we will rely on is the generalized arithmetic sequence, which we will define and discuss.
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Taxonomy
TopicsAerospace Engineering and Control Systems