Clustering in Varying Metrics
Abstract
We introduce the aggregated clustering problem, where one is given T instances of a center-based clustering task over the same n points, but under different metrics. The goal is to open k centers to minimize an aggregate of the clustering costs -- e.g., the average or maximum -- where the cost is measured via k-center/median/means objectives. More generally, we minimize a norm over the T cost values. We show that for T ≥ 3, the problem is inapproximable to any finite factor in polynomial time. For T = 2, we give constant-factor approximations. We also show W[2]-hardness when parameterized by k, but obtain f(k,T)poly(n)-time 3-approximations when parameterized by both k and T. When the metrics have structure, we obtain efficient parameterized approximation schemes (EPAS). If all T metrics have bounded -scatter dimension, we achieve a (1+)-approximation in f(k,T,)poly(n) time. If the metrics are induced by edge weights on a common graph G of bounded treewidth tw, and is the sum function, we get an EPAS in f(T,,tw)poly(n,k) time. Conversely, unless (randomized) ETH is false, any finite factor approximation is impossible if parametrized by only T, even when the treewidth is tw = (poly n).
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