中文

Dynamique des applications polynomiales semi-regulieres

动力系统 2007-05-23 v1

摘要

For any proper polynomial map f:CkCkf:C^k\longrightarrow C^k define the function \alpha as α(z):=lim supnlog+log+fn(z)nwherelog+:=max(log,0).\alpha(z):=\limsup_{n\to\infty} \frac{\log^+\log^+|f^n(z)|}{n} where \log^+:=\max(\log, 0). Let f=(P_1,...,P_k) be a proper polynomial map. We define a notion of s-regularity using the extension of f to P^k. When f is (maximally) regular we show that the function \alpha is l.s.c and takes only finitely many values: 0 and d_1, ..., d_k, where d_i:=deg P_i. We then describe dynamically the sets (\alpha\leq d_i). If d_i>1, this allows us to construct the equilibrium measure \mu associated to f as a generalized intersection of positive currents. We then gives an estimate of the Hausdorff dimension of \mu. This is a special case of our results. We extend the approach to the larger class of (\pi,s)-regular maps. This gives an understanding of the biggest values of \alpha. The results can be applied to construct dynamically interesting measures for automorphisms.

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引用

@article{arxiv.math/0211324,
  title  = {Dynamique des applications polynomiales semi-regulieres},
  author = {T. C. Dinh and N. Sibony},
  journal= {arXiv preprint arXiv:math/0211324},
  year   = {2007}
}

备注

29 pages, nouvelle version