The Julia sets of basic uniCremer polynomials of arbitrary degree

Abstract

Let P be a polynomial of degree d with a Cremer point p and no repelling or parabolic periodic bi-accessible points. We show that there are two types of such Julia sets JP. The red dwarf JP are nowhere connected im kleinen and such that the intersection of all impressions of external angles is a continuum containing p and the orbits of all critical images. The solar JP are such that every angle with dense orbit has a degenerate impression disjoint from other impressions and JP is connected im kleinen at its landing point. We study bi-accessible points and locally connected models of JP and show that such sets JP appear through polynomial-like maps for generic polynomials with Cremer points.