English

Deterministic Distributed Algorithms and Measurable Combinatorics on $\Delta$-Regular Forests

Logic 2025-12-05 v2 Distributed, Parallel, and Cluster Computing

Abstract

We investigate the connections between the fields of distributed computing and measurable combinatorics by considering complexity classes of locally checkable labeling problems on regular forests. We show that the most important deterministic complexity classes from the LOCAL model of distributed computing exactly coincide with well-studied classes in measurable combinatorics. Namely, first we show that a locally checkable labeling problem admits a continuous solution if and only if it can be solved by a deterministic local algorithm with complexity O(logn)O(\log^* n). Second, our main result states that, surprisingly, a locally checkable labeling problem admits a Baire measurable solution if and only if it can be solved by a local algorithm with complexity O(logn)O(\log n). These theorems suggest the existence of deeper connections between the two frameworks. Furthermore, the latter result relies on a complete combinatorial characterization of the classes in question, and as a by-product, it shows that membership in these classes is decidable.

Keywords

Cite

@article{arxiv.2204.09329,
  title  = {Deterministic Distributed Algorithms and Measurable Combinatorics on $\Delta$-Regular Forests},
  author = {Sebastian Brandt and Yi-Jun Chang and Jan Grebík and Christoph Grunau and Václav Rozhoň and Zoltán Vidnyánszky},
  journal= {arXiv preprint arXiv:2204.09329},
  year   = {2025}
}

Comments

This paper is an extension of some parts of the conference paper "Local Problems on Trees from the Perspectives of Distributed Algorithms, Finitary Factors, and Descriptive Combinatorics (arXiv:2106.02066)

R2 v1 2026-06-24T10:53:03.719Z