Linear Darboux polynomials for Lotka-Volterra systems, trees and superintegrable families
Abstract
We present a method to construct superintegrable n-component Lotka-Volterra systems with 3n-2 parameters. We apply the method to Lotka-Volterra systems with n components for 1 < n < 6, and present several n-dimensional superintegrable families. The Lotka-Volterra systems are in one-to-one correspondence with trees on n vertices.
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