Necklaces, permutations, and periodic critical orbits for quadratic polynomials

Abstract

Let Gn denote the n th Gleason polynomial, whose roots correspond to parameters c such that the critical point 0 is periodic of exact period n under iteration of z2 + c, and let Gn denote the reduction of Gn modulo 2. Buff, Floyd, Koch, and Parry made the surprising observation that the number of real roots of Gn is equal to the number of irreducible factors of Gn for all n. We provide a bijective proof for this result by first providing explicit bijections between (a) the set of real roots of Gn and the set N(n) of equivalence classes of primitive binary necklaces of length n under the inversion map swapping 0 and 1; and (b) the set of irreducible factors of Gn modulo 2 and the set N+(n) of binary necklaces which are either primitive of length n with an even number of 1's or primitive of length n/2 with an odd number of 1's. We then provide an explicit bijection, closely related to Milnor and Thurston's kneading theory, between N(n) and N+(n). In addition, we provide explicit bijections between N(n), the set CUP(n) of cyclic unimodal permutations of \ 1,…,n \, and the set N-(n) of primitive binary necklaces of length n with an odd number of 1's.