Preperiodic dynatomic curves for z-zd+c
Abstract
We study the preperiodic dynatomic curves X\n,p, the closure of set of (c,z)∈ 2 such that z is a preperiodic point of f\c with preperiod n and period p (n,p≥1). We prove that each X\n,p has exactly d-1 irreducible components, these components are all smooth and intersect pairwisely at the singular points of X\n,p. For each component, we calculate the genus of its compactification and then give a complete topological description of X\n,p. We also calculate the Galois group of the defining polynomial of X\n,p.
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