Phenomena of complex analytic dynamics in the non-autonomous, nonlinear   ring system

O.B. Isaeva; S.P. Kuznetsov; M.A. Obichev

arXiv:1011.4771·nlin.CD·December 12, 2011

Phenomena of complex analytic dynamics in the non-autonomous, nonlinear ring system

O.B. Isaeva, S.P. Kuznetsov, M.A. Obichev

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TL;DR

This paper introduces a non-autonomous ring cavity model with nonlinear elements that exhibits phenomena characteristic of complex analytic maps, advancing understanding of complex dynamics in physical systems.

Contribution

It presents a novel physical system model demonstrating complex analytic dynamics, bridging theoretical concepts with experimental potential.

Findings

01

Demonstrates complex analytic phenomena in a physical ring cavity system

02

Shows nonlinear and non-autonomous effects lead to complex dynamics

03

Provides a basis for experimental studies of complex maps in optics

Abstract

The model system manifesting phenomena peculiar to complex analytic maps is offered. The system is a non-autonomous ring cavity with nonlinear elements and filters,

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Taxonomy

TopicsChaos control and synchronization · Nonlinear Dynamics and Pattern Formation