Time-Optimal k-Server

Abstract

The time-optimal k-server problem minimizes the time spent serving all requests instead of the distances traveled. We give a lower bound of 2k-1 on the competitive ratio of any deterministic online algorithm for this problem, which coincides with the best known upper bound on the competitive ratio achieved by the work-function algorithm for the classical k-server problem. We provide further lower bounds of k+1 for all Euclidean spaces and k for uniform metric spaces. For the latter, we give a matching k-competitive deterministic algorithm. Our most technical result, proven by applying Yao's principle to a suitable instance distribution on a specifically constructed metric space, is a lower bound of k+O( k) that holds even for randomized algorithms, which contrasts with the best known lower bound for the classical problem that remains polylogarithmic. With this paper, we hope to initiate a further study of this natural yet neglected problem.

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