English

Inductive Solution of the Tangential Center Problem on Zero-Cycles

Dynamical Systems 2013-03-05 v2

Abstract

Given a polynomial f\C[z]f\in\C[z] of degree mm, let z1(t),...,zm(t)z_1(t),...,z_m(t) denote all algebraic functions defined by f(zk(t))=tf(z_k(t))=t. Given integers n1...,nmn_1...,n_m such that n1+...+nm=0n_1+...+n_m=0, the tangential center problem on zero-cycles asks to find all polynomials g\C[z]g\in\C[z] such that n1g(z1(t))+...+nmg(zm(t))0n_1g(z_1(t))+...+n_mg(z_m(t))\equiv 0. The classical Center-Focus Problem, or rather its tangential version in important non-trivial planar systems lead to the above problem. The tangential center problem on zero-cycles was recently solved in a preprint by Gavrilov and Pakovich. Here we give an alternative solution based on induction on the number of composition factors of ff under a generic hypothesis on ff. First we show the uniqueness of decompositions f=f1...fdf=f_1\circ...\circ f_d, such that every fkf_k is 2-transitive, monomial or a Chebyshev polynomial under the assumption that in the above composition there is no merging of critical values. Under this assumption, we give a complete (inductive) solution of the tangential center problem on zero-cycles. The inductive solution is obtained through three mechanisms: composition, primality and vanishing of the Newton-Girard component on projected cycles.

Cite

@article{arxiv.1202.5896,
  title  = {Inductive Solution of the Tangential Center Problem on Zero-Cycles},
  author = {Amelia Álvarez Sánchez and José Luis Bravo Trinidad and Pavao Mardesić},
  journal= {arXiv preprint arXiv:1202.5896},
  year   = {2013}
}

Comments

25 pages, 4 figures; new title, explanations added

R2 v1 2026-06-21T20:25:32.560Z