On the N-Extended Euler System I. Generalized Jacobi Elliptic Functions
Abstract
We study the integrable system of first order differential equations , as an initial value problem, with real coefficients and initial conditions . The analysis is based on its quadratic first integrals. For each dimension , the system defines a family of functions, generically hyperelliptic functions. When , this system generalizes the classic Euler system for the reduced flow of the free rigid body problem, thus we call it -extended Euler system (-EES). In this Part I the cases and are studied, generalizing Jacobi elliptic functions which are defined as a 3-EES. Taking into account the nested structure of the -EES, we propose reparametrizations of the type that separate geometry from dynamic. Some of those parametrizations turn out to be generalization of the {\sl Jacobi amplitude}. In Part II we consider geometric properties of the -system and the numeric computation of the functions involved. It will be published elsewhere.
Cite
@article{arxiv.1505.06142,
title = {On the N-Extended Euler System I. Generalized Jacobi Elliptic Functions},
author = {Sebastián Ferrer and Francisco Crespo and Francisco Javier Molero},
journal= {arXiv preprint arXiv:1505.06142},
year = {2015}
}