Local algorithms for Maximum Cut and Minimum Bisection on locally treelike regular graphs of large degree

TL;DR

This paper introduces a local message passing algorithm for near-optimal Max-Cut and Min-Bisection in large degree, locally treelike regular graphs, leveraging spin glass theory to achieve results close to theoretical limits.

Contribution

It develops a polynomial-time local algorithm that attains near-optimal Max-Cut values on large degree, locally treelike graphs, extending previous results on random regular graphs.

Findings

Achieves Max-Cut value close to the Parisi formula prediction.

Algorithm is nearly optimal on random regular graphs.

Shows that random regular graphs have nearly minimum Max-Cut and maximum Min-Bisection.

Abstract

Given a graph $G$ of degree $k$ over $n$ vertices, we consider the problem of computing a near maximum cut or a near minimum bisection in polynomial time. For graphs of girth $2L$, we develop a local message passing algorithm whose complexity is $O(nkL)$, and that achieves near optimal cut values among all $L$-local algorithms. Focusing on max-cut, the algorithm constructs a cut of value $nk/4+ n\mathsf{P}_\star\sqrt{k/4}+\mathsf{err}(n,k,L)$, where $\mathsf{P}_\star\approx 0.763166$ is the value of the Parisi formula from spin glass theory, and $\mathsf{err}(n,k,L)=o_n(n)+no_k(\sqrt{k})+n \sqrt{k} o_L(1)$ (subscripts indicate the asymptotic variables). Our result generalizes to locally treelike graphs, i.e., graphs whose girth becomes $2L$ after removing a small fraction of vertices. Earlier work established that, for random $k$-regular graphs, the typical max-cut value is $nk/4+ n\mathsf{P}_\star\sqrt{k/4}+o_n(n)+no_k(\sqrt{k})$. Therefore our algorithm is nearly optimal on such graphs. An immediate corollary of this result is that random regular graphs have nearly minimum max-cut, and nearly maximum min-bisection among all regular locally treelike graphs. This can be viewed as a combinatorial version of the near-Ramanujan property of random regular graphs.