A family of level-transitive groups with positive fixed-point proportion and positive Hausdorff dimension
Abstract
This article provides a method to calculate the fixed-point proportion of any iterated wreath product acting on a d-regular tree. Moreover, the method applies to a generalization of iterated wreath products acting on a d-regular tree, which are not groups. As an application of this generalization, a family of groups of finite type of depth 2 acting on a d-regular tree with d ≥ 3 and d ≠ 2 4 is constructed. These groups are self-similar, level-transitive, have positive Hausdorff dimension, and exhibit a positive fixed-point proportion. Unlike other groups with a positive fixed-point proportion known in the literature, the fixed-point proportion of this new family can be calculated explicitly. Furthermore, the iterated Galois group of the polynomial xd + 1 with d ≥ 2 appears in this family, so its fixed-point proportion is calculated.
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