Local-global conjugacy questions for affine extensions

Abstract

Boston and Jones constructed a probabilistic model, called the Markov model, in order to predict the cycle structures of elements in Galois groups Gn(f) associated to the n-th iterate of a quadratic postcritically finite polynomial f over a number field. Goksel refined this model, introducing the 'even' Markov groups Mn(f). These groups conjecturally contain a copy of Gn(f), leading to questions about local-global conjugacies within the larger automorphism group Aut(Tn) of the first n levels of the binary rooted tree coming from arboreal representations of the Galois groups. While the conjugacy results found by Goksel were restricted to the study of these automorphism groups, we generalise the findings to affine extensions of groups by permutation representations, using a cohomological argument. Furthermore, we provide a counterexample to the main conjecture proposed by Goksel, demonstrating that more work is required to resolve the underlying questions regarding Markov models.