English

Low Complexity Subshifts have Discrete Spectrum

Dynamical Systems 2023-09-15 v3

Abstract

We prove results about subshifts with linear (word) complexity, meaning that lim supp(n)n<\limsup \frac{p(n)}{n} < \infty, where for every nn, p(n)p(n) is the number of nn-letter words appearing in sequences in the subshift. Denoting this limsup by CC, we show that when C<43C < \frac{4}{3}, the subshift has discrete spectrum, i.e. is measurably isomorphic to a rotation of a compact abelian group with Haar measure. We also give an example with C=32C = \frac{3}{2} which has a weak mixing measure. This partially answers an open question of Ferenczi, who asked whether C=53C = \frac{5}{3} was the minimum possible among such subshifts; our results show that the infimum in fact lies in [43,32][\frac{4}{3}, \frac{3}{2}]. All results are consequences of a general S-adic/substitutive structure proved when C<43C < \frac{4}{3}.

Keywords

Cite

@article{arxiv.2302.10336,
  title  = {Low Complexity Subshifts have Discrete Spectrum},
  author = {Darren Creutz and Ronnie Pavlov},
  journal= {arXiv preprint arXiv:2302.10336},
  year   = {2023}
}
R2 v1 2026-06-28T08:45:04.727Z