Reducible Abelian varieties and Lax matrices for Euler's problem of two fixed centres

Abstract

Abel's quadratures for integrable Hamiltonian systems are defined up to a group law of the corresponding Abelian variety A. If A is isogenous to a direct product of Abelian varieties A A1×·s× Ak, the group law can be used to construct various Lax matrices on the factors A1,…,Ak. As an example, we discuss 2-dimensional reducible Abelian variety A=E+× E-, which is a product of 1-dimensional varieties E obtained by Euler in his study of the two fixed centres problem, and the Lax matrices on the factors E.