Integrable reductions of the Bogoyavlenskij-Itoh Lotka-Volterra systems

TL;DR

This paper proves the Liouville and non-commutative integrability of certain Toeplitz matrix-based Lotka-Volterra systems, extending known integrability results to new reduced systems with explicit first integrals.

Contribution

It demonstrates the integrability of reduced Lotka-Volterra systems derived from Toeplitz matrices, providing explicit polynomial and rational first integrals and establishing their involutive properties.

Findings

Reduced systems are Liouville integrable.

Constructed explicit polynomial and rational first integrals.

Proved functional independence of the integrals.

Abstract

Given a constant skew-symmetric matrix A, it is a difficult open problem whether the associated Lotka-Volterra system is integrable or not. We solve this problem in the special case when A is a Toepliz matrix where all off-diagonal entries are plus or minus one. In this case, the associated Lotka-Volterra system turns out to be a reduction of Liouville integrable systems, whose integrability was shown by Bogoyavlenskij and Itoh. We prove that the reduced systems are also Liouville integrable and that they are also non-commutative integrable by constructing a set of independent first integrals, having the required involutive properties (with respect to the Poisson bracket). These first integrals fall into two categories. One set consists of polynomial functions which can be obtained by a matricial reformulation of Itoh's combinatorial description. The other set consists of rational functions which are obtained through a Poisson map from the first integrals of some recently discovered superintegrable Lotka-Volterra systems. The fact that these polynomial and rational first integrals, combined, have the required properties for Liouville and non-commutative integrability is quite remarkable; the quite technical proof of functional independence of the first integrals is given in detail.