On the N-Extended Euler System I. Generalized Jacobi Elliptic Functions

TL;DR

This paper introduces a generalization of Jacobi elliptic functions through the study of an integrable system of differential equations called the N-extended Euler system, analyzing cases for N=4 and N=5 and proposing new parametrizations.

Contribution

It extends the classical Euler and Jacobi elliptic functions to higher dimensions, providing new functions and reparametrizations based on the N-extended Euler system.

Findings

Defined N-extended Euler system for N=4 and N=5

Proposed reparametrizations separating geometry from dynamics

Generalized Jacobi elliptic functions for higher dimensions

Abstract

We study the integrable system of first order differential equations $\omega_i(v)'=\alpha_i\,\prod_{j\neq i}\omega_j(v)$, $(1\!\leq i, j\leq\! N)$ as an initial value problem, with real coefficients $\alpha_i$ and initial conditions $\omega_i(0)$. The analysis is based on its quadratic first integrals. For each dimension $N$, the system defines a family of functions, generically hyperelliptic functions. When $N=3$, this system generalizes the classic Euler system for the reduced flow of the free rigid body problem, thus we call it $N$-extended Euler system ($N$-EES). In this Part I the cases $N=4$ and $N=5$ are studied, generalizing Jacobi elliptic functions which are defined as a 3-EES. Taking into account the nested structure of the $N$-EES, we propose reparametrizations of the type ${\rm d}v^*=g(\omega_i)\,{\rm d}v$ 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 $N$-system and the numeric computation of the functions involved. It will be published elsewhere.