Center conditions at infinity for Abel differential equations
成果类型:
Article
署名作者:
Briskin, Miriam; Roytvarf, Nina; Yomdin, Yosef
刊物名称:
ANNALS OF MATHEMATICS
ISSN/ISSBN:
0003-486X
DOI:
10.4007/annals.2010.172.437
发表日期:
2010
页码:
437-483
关键词:
periodic-solutions
Limit-cycles
return map
MODEL
POLYNOMIALS
INTEGRALS
moments
derivatives
POWERS
number
摘要:
An Abel differential equation y' = p (x) y(2) + q(x) y(3) is said to have a center at a set A = {a(1),...,a(r)} of complex numbers if y(a(1)) = y(a(2)) = ... = y (a(r)) for any solution y(x) (with the initial value y(a(1)) small enough). The polynomials p, q are said to satisfy the Polynomial Composition Condition on A if there exist polynomials P, Q and W such that P D R p and Q D R q are representable as P(x) = (P) over tilde (W(x)), Q(x) = (Q) over tilde (W(x)), and W(a(1)) = W(a(2)) = ... = W(a(r)). We show that for wide ranges of degrees of P and Q (restricted only by certain assumptions on the common divisors of these degrees) the composition condition provides a very accurate approximation of the Center one - up to a finite number of configurations not accounted for. To our best knowledge, this is the first general (i.e., not restricted to small degrees of p and q or to a very special form of these polynomials) result in the Center problem for Abel equations. As an important intermediate result we show that at infinity (according to an appropriate projectivization of the parameter space) the Center conditions are given by a system of the Moment equations of the form integral(as)(a1) P(k)q = 0, s = 2,...,r, k = 0. 1,....