English

Multiple partial rigidity rates in low complexity subshifts

Dynamical Systems 2024-12-13 v1

Abstract

Partial rigidity is a quantitative notion of recurrence and provides a global obstruction which prevents the system from being strongly mixing. A dynamical system (X,X,μ,T)(X, \mathcal{X}, \mu, T) is partially rigid if there is a constant δ>0\delta >0 and sequence (nk)kN(n_k)_{k \in \mathbb{N}} such that lim infkμ(ATnkA)δμ(A)\displaystyle \liminf_{k \to \infty } \mu(A \cap T^{n_k}A) \geq \delta \mu(A) for every AXA \in \mathcal{X}, and the partial rigidity rate is the largest δ\delta achieved over all sequences. For every integer d1d \geq 1, via an explicit construction, we prove the existence of a minimal subshift (X,S)(X,S) with dd ergodic measures having distinct partial rigidity rates. The systems built are S\mathcal{S}-adic subshifts of finite alphabetic rank that have non-superlinear word complexity and, in particular, have zero entropy.

Keywords

Cite

@article{arxiv.2412.08884,
  title  = {Multiple partial rigidity rates in low complexity subshifts},
  author = {Tristán Radić},
  journal= {arXiv preprint arXiv:2412.08884},
  year   = {2024}
}

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R2 v1 2026-06-28T20:31:49.139Z