Renormalization of three dimensional H\'enon map I : Reduction of ambient space

Abstract

Three dimensional analytic H\'enon-like map F(x,y,z) = (f(x) - ε(x,y,z),\, x,\, δ(x,y,z)) and its period doubling renormalization is defined. If F is infinitely renormalizable map, Jacobian determinant of nth renormalized map, RnF has asymptotically universal expression Jac RnF = bF2na(x)(1 + O(n)) where bF is the average Jacobian of F . The toy model map, Fmod is defined as the map satisfying ∂z ε 0 . The set of toy model map is invariant under renormalizaton. Moreover, if \| ∂z δ \| \| ∂y ε \| , then there exists the continuous invariant plane field over OF with dominated splitting. Under this condition, three dimensional H\'enon-like map %with the dominated splitting is dynamically decomposed into two dimensional map with contraction along the strong stable direction. Any invariant line field on this plane filed over OFmod cannot be continuous.