Color Visualization of Blaschke Self-Mappings of the Real Projective Plan

Abstract

The real projective plan P2 can be endowed with a dianalytic structure making it into a non orientable Klein surface. Dianalytic self-mappings of that surface are projections of analytic self-mappings of the Riemann sphere C. It is known that the only analytic bijective self-mappings of C are the Moebius transformations. The Blaschke products are obtained by multiplying particular Moebius transformations. They are no longer one-to-one mappings. However, some of these products can be projected on P2 and they become dianalytic self-mappings of P2. More exactly, they represent canonical projections of non orientable branched covering Klein surfaces over P2. This article is devoted to color visualization of such mappings. The working tool is the technique of simultaneous continuation we introduced in previous papers.