English

Finitely Dependent Processes on Subshifts

Probability 2026-05-05 v1 Dynamical Systems

Abstract

The existence of stationary finitely dependent processes on combinatorial models like Zd\mathbb Z^d subshifts can be quite mysterious. For instance, Holroyd and Liggett constructed such processes on proper 44-colorings of Zd\mathbb Z^d for all dd while Holroyd, Schramm and Wilson showed that there are no such processes on proper 33-colorings of Zd\mathbb Z^d for d>1d>1. In this paper, we take inspiration from these results and investigate them further. On the positive side, we show that there exists a dense set of stationary finitely dependent processes supported on subshifts with strong mixing properties like the finite extension property. On the negative side, we see that the cohomology of the subshifts can form an obstruction to the existence of such processes. In particular we use Conway-Lagarias-Thurston height functions to characterise when there exists a finitely dependent process on the space of tilings by boxes of Z2\mathbb Z^2 answering the tiling problem posed by Gao, Jackson, Krohne and Seward in dimension 22. The ideas also apply to many other models, such as graph homomorphisms and ribbon tilings. On the way, we also show that continuous cocycles on strongly irreducible subshifts valued in a special class of groups (including torsion free Gromov hyperbolic groups and free product of cyclic groups) are perturbations of group homomorphisms.

Keywords

Cite

@article{arxiv.2605.02226,
  title  = {Finitely Dependent Processes on Subshifts},
  author = {Nishant Chandgotia and Aditya Thorat},
  journal= {arXiv preprint arXiv:2605.02226},
  year   = {2026}
}

Comments

71 pages

R2 v1 2026-07-01T12:47:58.752Z