The Competition Complexity of Prophet Secretary

Abstract

We study the classic single-choice prophet secretary problem through a resource augmentation lens. Our goal is to bound the (1-ε)-competition complexity for different classes of online algorithms. This metric asks for the smallest k such that the expected value of the online algorithm on k copies of the original instance, is at least a (1 - ε)-approximation to the expected offline optimum on the original instance (without added copies). We consider four natural classes of online algorithms: single-threshold, time-based threshold, activation-based, and general algorithms. We show that for single-threshold algorithms the (1-ε)-competition complexity is ((1ε)) (as in the i.i.d. case). Additionally, we demonstrate that time-based threshold and activation-based algorithms (which cover all previous approaches for obtaining competitive-ratios for the classic prophet secretary problem) yield a sub-optimal (1-ε)-competition complexity of ((1ε)(1ε)), which is strictly better than the class of single-threshold algorithms. Finally, we find that the (1-ε)-competition complexity of general adaptive algorithms is ((1ε)), which is in sharp contrast to ((1ε)) in the i.i.d. case.

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