Completing the Node-Averaged Complexity Landscape of LCLs on Trees

TL;DR

This paper completes the understanding of the node-averaged complexity landscape of locally checkable labelings on bounded-degree trees, identifying all possible complexity classes and gaps for randomized and deterministic algorithms.

Contribution

It provides a complete characterization of the node-averaged complexity landscape of LCLs on bounded-degree trees, filling previous gaps and establishing new complexity bounds.

Findings

No LCL with complexity between ω(1) and (log* n)^{o(1)}.

Existence of LCLs with complexities between (log* n)^c and (log* n)^{c+ε}.

Existence of LCLs with polynomial node-averaged complexity within specific ranges.

Abstract

The node-averaged complexity of a problem captures the number of rounds nodes of a graph have to spend on average to solve the problem in the LOCAL model. A challenging line of research with regards to this new complexity measure is to understand the complexity landscape of locally checkable labelings (LCLs) on families of bounded-degree graphs. Particularly interesting in this context is the family of bounded-degree trees as there, for the worst-case complexity, we know a complete characterization of the possible complexities and structures of LCL problems. A first step for the node-averaged complexity case has been achieved recently [DISC '23], where the authors in particular showed that in bounded-degree trees, there is a large complexity gap: There are no LCL problems with a deterministic node-averaged complexity between $\omega(\log^* n)$ and $n^{o(1)}$. For randomized algorithms, they even showed that the node-averaged complexity is either $O(1)$ or $n^{\Omega(1)}$. In this work we fill in the remaining gaps and give a complete description of the node-averaged complexity landscape of LCLs on bounded-degree trees. Our contributions are threefold. - On bounded-degree trees, there is no LCL with a node-averaged complexity between $\omega(1)$ and $(\log^*n)^{o(1)}$. - For any constants $0<r_1 < r_2 \leq 1$ and $\varepsilon>0$, there exists a constant $c$ and an LCL problem with node-averaged complexity between $\Omega((\log^* n)^c)$ and $O((\log^* n)^{c+\varepsilon})$. - For any constants $0<\alpha\leq 1/2$ and $\varepsilon>0$, there exists an LCL problem with node-averaged complexity $\Theta(n^x)$ for some $x\in [\alpha, \alpha+\varepsilon]$.