Irreducibility of eventually 2-periodic curves in the moduli space of cubic polynomials

Abstract

Consider the moduli space, M3, of cubic polynomials over C, with a marked critical point. Let Sk,n be the set of all points in M3 for which the marked critical point is strictly (k,n)-preperiodic. Milnor conjectured that the affine algebraic curves Sk,n are irreducible, for all k ≥ 0, n>0. In this article, we show the irreducibility of eventually 2-periodic curves, i.e. Sk,2,\; k≥ 0 curves. We also note that the curves, Sk,2,\; k≥ 0, exhibit a possible splitting-merging phenomenon that has not been observed in earlier studies of Sk,n curves. Finally, using the irreducibility of Sk,2 curves, we give a new and short proof of Galois conjugacy of unicritical points lying on Sk,2, for even natural number k.