English

Parametric Center-Focus Problem for Abel Equation

Classical Analysis and ODEs 2018-01-09 v3

Abstract

The Abel differential equation y=p(x)y3+q(x)y2y'=p(x)y^3 + q(x) y^2 with meromorphic coefficients p,qp,q is said to have a center on [a,b][a,b] if all its solutions, with the initial value y(a)y(a) small enough, satisfy the condition y(a)=y(b)y(a)=y(b). The problem of giving conditions on (p,q,a,b)(p,q,a,b) implying a center for the Abel equation is analogous to the classical Poincar\'e Center-Focus problem for plane vector fields. Following [3,4,8,9] we say that Abel equation has a "parametric center" if for each εC\varepsilon \in \mathbb C the equation y=p(x)y3+εq(x)y2y'=p(x)y^3 + \varepsilon q(x) y^2 has a center. In the present paper we use recent results of [15,6} to show show that for a polynomial Abel equation parametric center implies strong "composition" restriction on pp and qq. In particular, we show that for degp,q10\deg p,q \leq 10 parametric center is equivalent to the so-called "Composition Condition" (CC) on p,qp,q. Second, we study trigonometric Abel equation, and provide a series of examples, generalizing a recent remarkable example given in [8], where certain moments of p,qp,q vanish while (CC) is violated.

Cite

@article{arxiv.1312.1609,
  title  = {Parametric Center-Focus Problem for Abel Equation},
  author = {M. Briskin and F. Pakovich and Y. Yomdin},
  journal= {arXiv preprint arXiv:1312.1609},
  year   = {2018}
}

Comments

This version is identical to the first one. The replacement is due to the fact that by mistake as a second version another paper was downnloaded. The paper was published by "Qual. Theory Dyn. Syst" in 2014

R2 v1 2026-06-22T02:21:45.370Z