Simultaneously preperiodic points for families of polynomials in normal form

Abstract

Let d>m>1 be integers, let c1,…, cm+1 be distinct complex numbers, and let f(z):=zd+t1zm-1+t2zm-2+·s + tm-1z+tm be an m-parameter family of polynomials. We prove that the set of m-tuples of parameters (t1,…, tm)∈Cm with the property that each ci (for i=1,…, m+1) is preperiodic under the action of the corresponding polynomial f(z) is contained in finitely many hypersurfaces of the parameter space Am.