English

Approximation Algorithms for Clustering Problems with Lower Bounds and Outliers

Data Structures and Algorithms 2016-11-04 v3

Abstract

We consider clustering problems with {\em non-uniform lower bounds and outliers}, and obtain the {\em first approximation guarantees} for these problems. We have a set \F\F of facilities with lower bounds {Li}i\F\{L_i\}_{i\in\F} and a set \D\D of clients located in a common metric space {c(i,j)}i,j\F\D\{c(i,j)\}_{i,j\in\F\cup\D}, and bounds kk, mm. A feasible solution is a pair (S\sse\F,σ:\DS{out})\bigl(S\sse\F,\sigma:\D\mapsto S\cup\{\mathsf{out}\}\bigr), where σ\sigma specifies the client assignments, such that Sk|S|\leq k, σ1(i)Li|\sigma^{-1}(i)|\geq L_i for all iSi\in S, and σ1(out)m|\sigma^{-1}(\mathsf{out})|\leq m. In the {\em lower-bounded min-sum-of-radii with outliers} (\lbksro) problem, the objective is to minimize iSmaxjσ1(i)c(i,j)\sum_{i\in S}\max_{j\in\sigma^{-1}(i)}c(i,j), and in the {\em lower-bounded kk-supplier with outliers} (\lbkso) problem, the objective is to minimize maxiSmaxjσ1(i)c(i,j)\max_{i\in S}\max_{j\in\sigma^{-1}(i)}c(i,j). We obtain an approximation factor of 12.36512.365 for \lbksro, which improves to 3.833.83 for the non-outlier version (i.e., m=0m=0). These also constitute the {\em first} approximation bounds for the min-sum-of-radii objective when we consider lower bounds and outliers {\em separately}. We apply the primal-dual method to the relaxation where we Lagrangify the Sk|S|\leq k constraint. The chief technical contribution and novelty of our algorithm is that, departing from the standard paradigm used for such constrained problems, we obtain an O(1)O(1)-approximation {\em despite the fact that we do not obtain a Lagrangian-multiplier-preserving algorithm for the Lagrangian relaxation}. We believe that our ideas have {broader applicability to other clustering problems with outliers as well.} We obtain approximation factors of 55 and 33 respectively for \lbkso and its non-outlier version. These are the {\em first} approximation results for kk-supplier with {\em non-uniform} lower bounds.

Keywords

Cite

@article{arxiv.1608.01700,
  title  = {Approximation Algorithms for Clustering Problems with Lower Bounds and Outliers},
  author = {Sara Ahmadian and Chaitanya Swamy},
  journal= {arXiv preprint arXiv:1608.01700},
  year   = {2016}
}
R2 v1 2026-06-22T15:12:48.498Z