Reversible Complex Hénon Maps

Abstract

We identify and investigate a class of complex Hénon maps {\small $H:\C^2\rightarrow\C^2$} that are reversible, that is, each H can be factorized as RU where {\small $R^2=U^2=\id_{\C^2}$}. Fixed points and periodic points of order two or three are classified in terms of symmetry, with respect to R or U, and as either elliptic or saddle points. We report on experimental investigation, using a Java applet, of the bounded orbits of H.