English

Wild solenoids

Dynamical Systems 2017-02-13 v1

Abstract

A weak solenoid is a foliated space defined as the inverse limit of finite coverings of a closed compact manifold MM. The monodromy of a weak solenoid defines an equicontinuous minimal action on a Cantor space XX by the fundamental group GG of MM. The discriminant group of this action is an obstruction to this action being homogeneous. The discriminant vanishes if the group GG is abelian, but there are examples of actions of nilpotent groups for which the discriminant is non-trivial. The action is said to be stable if the discriminant group remains unchanged for the induced action on sufficiently small clopen neighborhoods in XX. If the discriminant group never stabilizes as the diameter of the clopen set UU tends to zero, then we say that the action is unstable, and the weak solenoid which defines it is said to be wild. In this work, we show two main results in the course of our study of the properties of the discriminant group for Cantor actions. First, the tail equivalence class of the sequence of discriminant groups obtained for the restricted action on a neighborhood basis system of a point in XX defines an invariant of the return equivalence class of the action, called the asymptotic discriminant, which is consequently an invariant of the homeomorphism class of the weak solenoid. Second, we construct uncountable collections of wild solenoids with pairwise distinct asymptotic discriminant invariants for a fixed base manifold MM, and hence fixed finitely-presented group GG, which are thus pairwise non-homeomorphic. The study in this work is the continuation of the seminal works on homeomorphisms of weak solenoids by Rogers and Tollefson in 1971, and is dedicated to the memory of Jim Rogers.

Cite

@article{arxiv.1702.03032,
  title  = {Wild solenoids},
  author = {Steven Hurder and Olga Lukina},
  journal= {arXiv preprint arXiv:1702.03032},
  year   = {2017}
}

Comments

Dedicated to the memory of Jim Rogers

R2 v1 2026-06-22T18:14:28.425Z