Online 3-Taxi on General Metrics
Abstract
The online k-taxi problem, introduced in 1990 by Fiat, Rabani and Ravid, is a generalization of the k-server problem where k taxis must serve a sequence of requests in a metric space. Each request is a pair of two points, representing the pick-up and drop-off location of a passenger. In the interesting ''hard'' version of the problem, the cost is the total distance that the taxis travel without a passenger. The problem is known to be substantially harder than the k-server problem, and prior to this work even for k=3 taxis it has been unknown whether a finite competitive ratio is achievable on general metric spaces. We present an O(1)-competitive algorithm for the 3-taxi problem.
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