Simple Proofs for the Derivative Estimates of the Holomorphic Motion near Two Boundary Points of the Mandelbrot Set

Abstract

For the complex quadratic family qc:z z2+c, it is known that every point in the Julia set J(qc) moves holomorphically on c except at the boundary points of the Mandelbrot set. In this note, we present short proofs of the following derivative estimates of the motions near the boundary points 1/4 and -2: for each z = z(c) in the Julia set, the derivative dz(c)/dc is uniformly O(1/1/4-c) when real c 1/4; and is uniformly O(1/-2-c) when real c -2. These estimates of the derivative imply Hausdorff convergence of the Julia set J(qc) when c approaches these boundary points. In particular, the Hausdorff distance between J(qc) with 0 c<1/4 and J(q1/4) is exactly 1/4-c.