Online Correlation Clustering: Simultaneously Optimizing All p-norms
Abstract
The p-norm objectives for correlation clustering present a fundamental trade-off between minimizing total disagreements (the 1-norm) and ensuring fairness to individual nodes (the ∞-norm). Surprisingly, in the offline setting it is possible to simultaneously approximate all p-norms with a single clustering. Can this powerful guarantee be achieved in an online setting? This paper provides the first affirmative answer. We present a single algorithm for the online-with-a-sample (AOS) model that, given a small constant fraction of the input as a sample, produces one clustering that is simultaneously O(4 n)-competitive for all p-norms with high probability, O( n)-competitive for the ∞-norm with high probability, and O(1)-competitive for the 1-norm in expectation. This work successfully translates the offline "all-norms" guarantee to the online world. Our setting is motivated by a new hardness result that demonstrates a fundamental separation between these objectives in the standard random-order (RO) online model. Namely, while the 1-norm is trivially O(1)-approximable in the RO model, we prove that any algorithm in the RO model for the fairness-promoting ∞-norm must have a competitive ratio of at least (n1/3). This highlights the necessity of a different beyond-worst-case model. We complement our algorithm with lower bounds, showing our competitive ratios for the 1- and ∞- norms are nearly tight in the AOS model.
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