On intertwined polynomials
Abstract
Let A1 and A2 be polynomials of degree at least two over C. We say that A1 and A2 are intertwined if the endomorphism (A1, A2) of C P1 × C P1 given by (z1, z2) (A1(z1), A2(z2)) admits an irreducible periodic curve that is neither a vertical nor a horizontal line. We denote by Inter(A) the set of all polynomials B such that some iterate of B is intertwined with some iterate of A. In this paper, we prove a conjecture of Favre and Gauthier describing the structure of Inter(A). We also obtain a bound on the possible periods of periodic curves for endomorphisms (A1, A2) in terms of the sizes of the symmetry groups of the Julia sets of A1 and A2.
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