The method of Puiseux series and invariant algebraic curves

Abstract

An explicit expression for the cofactor related to an irreducible invariant algebraic curve of a polynomial dynamical system in the plane is derived. A sufficient condition for a polynomial dynamical system in the plane to have a finite number of irreducible invariant algebraic curves is obtained. All these results are applied to Li\'enard dynamical systems xt=y, yt=-f(x)y-g(x) with deg\, f<deg\,g<2\,deg\,f+1. The general structure of their irreducible invariant algebraic curves and cofactors is found. It is shown that Li\'enard dynamical systems with deg\, f<deg\, g<2\,deg\, f+1 can have at most two distinct irreducible invariant algebraic curves simultaneously and consequently are not integrable with a rational first integral.