Correlation Clustering and Biclustering with Locally Bounded Errors
Abstract
We consider a generalized version of the correlation clustering problem, defined as follows. Given a complete graph whose edges are labeled with or , we wish to partition the graph into clusters while trying to avoid errors: edges between clusters or edges within clusters. Classically, one seeks to minimize the total number of such errors. We introduce a new framework that allows the objective to be a more general function of the number of errors at each vertex (for example, we may wish to minimize the number of errors at the worst vertex) and provide a rounding algorithm which converts "fractional clusterings" into discrete clusterings while causing only a constant-factor blowup in the number of errors at each vertex. This rounding algorithm yields constant-factor approximation algorithms for the discrete problem under a wide variety of objective functions.
Cite
@article{arxiv.1506.08189,
title = {Correlation Clustering and Biclustering with Locally Bounded Errors},
author = {Gregory J. Puleo and Olgica Milenkovic},
journal= {arXiv preprint arXiv:1506.08189},
year = {2016}
}
Comments
20 pages, reorganized paper to emphasize the key properties of the rounding algorithm and the broader class of possible objective functions