English

Approximation Schemes for Clustering with Outliers

Data Structures and Algorithms 2017-07-17 v1

Abstract

Clustering problems are well-studied in a variety of fields such as data science, operations research, and computer science. Such problems include variants of centre location problems, kk-median, and kk-means to name a few. In some cases, not all data points need to be clustered; some may be discarded for various reasons. We study clustering problems with outliers. More specifically, we look at Uncapacitated Facility Location (UFL), kk-Median, and kk-Means. In UFL with outliers, we have to open some centres, discard up to zz points of X\cal X and assign every other point to the nearest open centre, minimizing the total assignment cost plus centre opening costs. In kk-Median and kk-Means, we have to open up to kk centres but there are no opening costs. In kk-Means, the cost of assigning jj to ii is δ2(j,i)\delta^2(j,i). We present several results. Our main focus is on cases where δ\delta is a doubling metric or is the shortest path metrics of graphs from a minor-closed family of graphs. For uniform-cost UFL with outliers on such metrics we show that a multiswap simple local search heuristic yields a PTAS. With a bit more work, we extend this to bicriteria approximations for the kk-Median and kk-Means problems in the same metrics where, for any constant ϵ>0\epsilon > 0, we can find a solution using (1+ϵ)k(1+\epsilon)k centres whose cost is at most a (1+ϵ)(1+\epsilon)-factor of the optimum and uses at most zz outliers. We also show that natural local search heuristics that do not violate the number of clusters and outliers for kk-Median (or kk-Means) will have unbounded gap even in Euclidean metrics. Furthermore, we show how our analysis can be extended to general metrics for kk-Means with outliers to obtain a (25+ϵ,1+ϵ)(25+\epsilon,1+\epsilon) bicriteria.

Keywords

Cite

@article{arxiv.1707.04295,
  title  = {Approximation Schemes for Clustering with Outliers},
  author = {Zachary Friggstad and Kamyar Khodamoradi and Mohsen Rezapour and Mohammad R. Salavatipour},
  journal= {arXiv preprint arXiv:1707.04295},
  year   = {2017}
}
R2 v1 2026-06-22T20:46:32.292Z