Clustering Graphs of Bounded Treewidth to Minimize the Sum of Radius-Dependent Costs
Abstract
We consider the following natural problem that generalizes min-sum-radii clustering: Given is k∈N as well as some metric space (V,d) where V=F C for facilities F and clients C. The goal is to find a clustering given by k facility-radius pairs (f1,r1),…,(fk,rk)∈ F×R≥ 0 such that C⊂eq B(f1,r1)… B(fk,rk) and Σi=1,…,k g(ri) is minimized for some increasing function g:R≥ 0→R≥ 0. Here, B(x,r) is the radius-r ball centered at x. For the case that (V,d) is the shortest-path metric of some edge-weighted graph of bounded treewidth, we present a dynamic program that is tailored to this class of problems and achieves a polynomial running time, establishing that the problem is in XP with parameter treewidth.
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