Almost Global Problems in the LOCAL Model

TL;DR

This paper explores the complexity landscape of locally checkable problems in distributed computing, revealing new complexity gaps and constructions in general graphs and trees, especially between 5() and o(n).

Contribution

It demonstrates the existence of LCL problems with infinitely many complexities between 5() and o(n) in general graphs, and proves such complexities do not exist in trees.

Findings

In general graphs, infinitely many complexities between 5() and o(n) exist.

In trees, no problems with complexities in that range exist.

Any LCL with complexity o(n) in trees can be solved in O((n)) time.

Abstract

The landscape of the distributed time complexity is nowadays well-understood for subpolynomial complexities. When we look at deterministic algorithms in the LOCAL model and locally checkable problems (LCLs) in bounded-degree graphs, the following picture emerges: - There are lots of problems with time complexities of $\Theta(\log^* n)$ or $\Theta(\log n)$. - It is not possible to have a problem with complexity between $\omega(\log^* n)$ and $o(\log n)$. - In general graphs, we can construct LCL problems with infinitely many complexities between $\omega(\log n)$ and $n^{o(1)}$. - In trees, problems with such complexities do not exist. However, the high end of the complexity spectrum was left open by prior work. In general graphs there are LCL problems with complexities of the form $\Theta(n^\alpha)$ for any rational $0 < \alpha \le 1/2$, while for trees only complexities of the form $\Theta(n^{1/k})$ are known. No LCL problem with complexity between $\omega(\sqrt{n})$ and $o(n)$ is known, and neither are there results that would show that such problems do not exist. We show that: - In general graphs, we can construct LCL problems with infinitely many complexities between $\omega(\sqrt{n})$ and $o(n)$. - In trees, problems with such complexities do not exist. Put otherwise, we show that any LCL with a complexity $o(n)$ can be solved in time $O(\sqrt{n})$ in trees, while the same is not true in general graphs.