English

Normal forms for non-uniform contractions

Dynamical Systems 2016-05-13 v2

Abstract

Let ff be a measure-preserving transformation of a Lebesgue space (X,μ)(X,\mu) and let \f\f be its extension to a bundle \E=X×\Rm\E = X \times\Rm by smooth fiber maps \fx:\Ex\Efx\f_x : \E_x \to \E_{fx} so that the derivative of \f\f at the zero section has negative Lyapunov exponents. We construct a measurable system of smooth coordinate changes \hx\h_x on \Ex\E_x for μ\mu-a.e. xx so that the maps \px=\hfx\fx\hx1\p_x =\h_{fx} \circ \f_x \circ \h_x ^{-1} are sub-resonance polynomials in a finite dimensional Lie group. Our construction shows that such \hx\h_x and \px\p_x are unique up to a sub-resonance polynomial. As a consequence, we obtain the centralizer theorem that the coordinate change \h\h also conjugates any commuting extension to a polynomial extension of the same type. We apply our results to a measure-preserving diffeomorphism ff with a non-uniformly contracting invariant foliation WW. We construct a measurable system of smooth coordinate changes \hx:WxTxW\h_x: W_x \to T_xW such that the maps \hfxf\hx1\h_{fx} \circ f \circ \h_x ^{-1} are polynomials of sub-resonance type. Moreover, we show that for almost every leaf the coordinate changes exist at each point on the leaf and give a coherent atlas with transition maps in a finite dimensional Lie group.

Keywords

Cite

@article{arxiv.1604.03963,
  title  = {Normal forms for non-uniform contractions},
  author = {Boris Kalinin and Victoria Sadovskaya},
  journal= {arXiv preprint arXiv:1604.03963},
  year   = {2016}
}
R2 v1 2026-06-22T13:31:51.709Z