Litcius/Paper detail

The method of Puiseux series and invariant algebraic curves

Maria V. Demina

2021Communications in Contemporary Mathematics19 citationsDOIOpen Access PDF

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 Liénard dynamical systems [Formula: see text], [Formula: see text] with [Formula: see text]. The general structure of their irreducible invariant algebraic curves and cofactors is found. It is shown that Liénard dynamical systems with [Formula: see text] can have at most two distinct irreducible invariant algebraic curves simultaneously and, consequently, are not integrable with a rational first integral.

Topics & Concepts

MathematicsInvariant (physics)Algebraic curveDynamical systems theoryPure mathematicsAlgebraic numberInvariant polynomialAlgebraic surfacePlane curveIntegrable systemInvariant theoryPolynomialMathematical analysisAlgebra over a fieldMatrix polynomialMathematical physicsPhysicsQuantum mechanicsAdvanced Differential Equations and Dynamical SystemsNonlinear Waves and SolitonsQuantum chaos and dynamical systems
The method of Puiseux series and invariant algebraic curves | Litcius