Algebraic independence of the solutions of the classical Lotka-Volterra system

Abstract

Let (x1,y1),…,(xn,yn) be distinct non-constant and non-degenerate solutions of the classical Lotka-Volterra system equation split x'&= axy + bx\\ y'&= cxy + dy, split equation where a,b,c,d∈C\0\. We show that if d and b are linearly independent over Q, then the solutions are algebraically independent over C, that is tr.degCC(x1,y1,…,xn,yn)=2n. As a main part of the proof, we show that the set defined by the system in universal differential fields, with d and b linearly independent over Q, is strongly minimal and geometrically trivial. Our techniques also allows us to obtain partial results for some of the more general 2d-Lotka-Volterra system.

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