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Isochronous Systems
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Isochronous Systems

Francesco Calogero

Abstract

A classical dynamical system is called isochronous if it features in its phase space an open, fully dimensional sector where all its solutions are periodic in all their degrees of freedom with the same, fixed period. Recently, a simple transformation has been introduced, featuring a real parameter ω and reducing to the identity for ω=0. This transformation is applicable to a quite large class of dynamical systems and it yields ω-modified autonomous systems which are isochronous, with period T = 2π/ω. This justifies the notion that isochronous systems are not rare. In this monograph—which cover ... More

Keywords: Dynamical systems, isochronous systems, periodic systems, Hamiltonian systems, many-body problems, nonlinear evolution equations, integrable systems, nonintegrable systems

Bibliographic Information

Print publication date: 2008 Print ISBN-13: 9780199535286
Published to Oxford Scholarship Online: May 2008 DOI:10.1093/acprof:oso/9780199535286.001.0001

Authors

Affiliations are at time of print publication.

Francesco Calogero, author
Department of Physics, University of Rome "La Sapienza"