English

Local Guarantees in Graph Cuts and Clustering

Data Structures and Algorithms 2017-04-04 v1

Abstract

Correlation Clustering is an elegant model that captures fundamental graph cut problems such as Min sts-t Cut, Multiway Cut, and Multicut, extensively studied in combinatorial optimization. Here, we are given a graph with edges labeled ++ or - and the goal is to produce a clustering that agrees with the labels as much as possible: ++ edges within clusters and - edges across clusters. The classical approach towards Correlation Clustering (and other graph cut problems) is to optimize a global objective. We depart from this and study local objectives: minimizing the maximum number of disagreements for edges incident on a single node, and the analogous max min agreements objective. This naturally gives rise to a family of basic min-max graph cut problems. A prototypical representative is Min Max sts-t Cut: find an sts-t cut minimizing the largest number of cut edges incident on any node. We present the following results: (1)(1) an O(n)O(\sqrt{n})-approximation for the problem of minimizing the maximum total weight of disagreement edges incident on any node (thus providing the first known approximation for the above family of min-max graph cut problems), (2)(2) a remarkably simple 77-approximation for minimizing local disagreements in complete graphs (improving upon the previous best known approximation of 4848), and (3)(3) a 1/(2+ε)1/(2+\varepsilon)-approximation for maximizing the minimum total weight of agreement edges incident on any node, hence improving upon the 1/(4+ε)1/(4+\varepsilon)-approximation that follows from the study of approximate pure Nash equilibria in cut and party affiliation games.

Keywords

Cite

@article{arxiv.1704.00355,
  title  = {Local Guarantees in Graph Cuts and Clustering},
  author = {Moses Charikar and Neha Gupta and Roy Schwartz},
  journal= {arXiv preprint arXiv:1704.00355},
  year   = {2017}
}
R2 v1 2026-06-22T19:05:02.048Z