Convergence Criteria for Dynamic Integer Systems

Klaus Weise (Private research)

arXiv:2110.12471·math.DS·October 26, 2021

Convergence Criteria for Dynamic Integer Systems

Klaus Weise (Private research)

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Open Access

TL;DR

This paper introduces criteria to determine if all trajectories of a dynamic integer system eventually converge to a single fixed point, aiding in understanding system stability.

Contribution

It provides new convergence criteria specifically designed for dynamic integer systems, enhancing analysis methods for such systems.

Findings

01

Criteria successfully identify convergent trajectories

02

Applicable to a wide class of integer systems

03

Improves stability analysis techniques

Abstract

Criteria are presented for testing whether every trajectory of a dynamic integer system converges to the same fixed point

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Taxonomy

TopicsBenford’s Law and Fraud Detection · Computability, Logic, AI Algorithms · semigroups and automata theory