Local connectivity of the Mandelbrot set at some satellite parameters of bounded type

Abstract

We explore geometric properties of the Mandelbrot set M, and the corresponding Julia sets Jc, near the main cardioid. Namely, we establish that: a) M is locally connected at certain infinitely renormalizable parameters c of bounded satellite type, providing first examples of this kind; b) The Julia sets Jc are also locally connected and have positive area; c) M is self-similar near Siegel parameters of constant type. We approach these problems by analyzing the unstable manifold of the pacman renormalization operator constructed in [DLS] as a global transcendental family.