Chara Pantazi scite author profile

Abstract. Planar polynomial vector fields which admit invariant algebraic curves, Darboux integrating factors or Darboux first integrals are of special interest. In the present paper we solve the inverse problem for invariant algebraic curves with a given multiplicity and for integrating factors, under generic assumptions regarding the (multiple) invariant algebraic curves involved. In particular we prove, in this generic scenario, that the existence of a Darboux integrating factor implies Darboux integrability. Furthermore we construct examples where the genericity assumption does not hold and indicate that the situation is different for these.

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First integrals of local analytic differential systems

Llibre

Pantazi

Walcher

2012

Bulletin des Sciences Mathématiques

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Darboux integrating factors: Inverse problems

Christopher

Llibre

Pantazi

et al. 2011

Journal of Differential Equations

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We discuss planar polynomial vector fields with prescribed Darboux integrating factors, in a nondegenerate affine geometric setting. We establish a reduction principle which transfers the problem to polynomial solutions of certain meromorphic linear systems, and show that the space of vector fields with a given integrating factor, modulo a subspace of explicitly known "standard" vector fields, has finite dimension. For several classes of examples we determine this space explicitly.

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Centers of quasi-homogeneous polynomial differential equations of degree three

Aziz

Llibre

Pantazi

2014

Advances in Mathematics

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Chara Pantazi

Darboux integrability and invariant algebraic curves for planar polynomial systems

Inverse problems for multiple invariant curves

First integrals of local analytic differential systems

Darboux integrating factors: Inverse problems

Centers of quasi-homogeneous polynomial differential equations of degree three

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