English

\L ojasiewicz exponents and Farey sequences

Algebraic Geometry 2019-10-02 v1

Abstract

\noindent Let II be an ideal of the ring of formal power series \bK[[x,y]]\bK[[x,y]] with coefficients in an algebraically closed field \bK\bK of arbitrary characteristic. Let Φ\Phi denote the set of all parametrizations φ=(φ1,φ2)\bK[[t]]2\varphi=(\varphi_1,\varphi_2)\in \bK[[t]]^2, where φ(0,0)\varphi \neq (0,0) and φ(0,0)=(0,0)\varphi (0,0)=(0,0). The purpose of this paper is to investigate the invariant \Lo(I)=supφΦ(inffI\ordfφ\ordφ) \Lo(I)=\sup_{\varphi \in \Phi}\left(\inf_{f\in I} \frac{\ord f \circ \varphi}{\ord \varphi}\right) \noindent called the {\it \L ojasiewicz exponent} of II. Our main result states that for the ideals II of finite codimension the \L ojasiewicz exponent \Lo(I)\Lo(I) is a Farey number i.e. an integer or a rational number of the form N+baN+\frac{b}{a}, where a,b,Na,b,N are integers such that 0<b<a<N0<b<a<N.

Cite

@article{arxiv.1511.08846,
  title  = {\L ojasiewicz exponents and Farey sequences},
  author = {A. B. de Felipe and E. R. García Barroso and J. Gwoździewicz and A. Płoski},
  journal= {arXiv preprint arXiv:1511.08846},
  year   = {2019}
}

Comments

7 pages

R2 v1 2026-06-22T11:56:01.475Z