Factorization of the quadratic Misiurewicz-Thurston polynomials

Abstract

This note provides the complete factorization of the Misiurewicz-Thurston polynomial q,n=p+n(z) - p(z) over C, which plays a central role in the study of the Mandelbrot set, where \[ p0(z) = 0, pn+1(z) = pn(z)2 + z. \] The roots can be classified into two categories. First, there are hyperbolic points hyp(k) for any divisor k of n, which are parameters whose critical orbits are of exact period k. Those are roots of q,n with multiplicity -1k + 2. Next are the points mis(j,k) for 2≤ j≤ whose critical orbits are pre-periodic of exact period k with an exact pre-period j. Those are simple roots of q,n.