Proceedings of the 2019 ACM Conference on Economics and Computation 2019
DOI: 10.1145/3328526.3329627
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Prophet Inequalities for I.I.D. Random Variables from an Unknown Distribution

Abstract: A central object in optimal stopping theory is the single-choice prophet inequality for independent, identically distributed random variables: Given a sequence of random variables X 1 , . . . , X n drawn independently from a distribution F, the goal is to choose a stopping time τ so as to maximize α such that for all distributions F we haveWhat makes this problem challenging is that the decision whether τ = t may only depend on the values of the random variables X 1 , . . . , X t and on the distribution F. For… Show more

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Cited by 45 publications
(54 citation statements)
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References 29 publications
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“…Interestingly, our bound surpasses that of Azar et al [3] which until very recently was the best known bound for (the full information) prophet secretary. Furthermore, our bound also beats the bound of 1 − 1/e obtained by Correa et al [5] for the i.i.d. single-sample prophet inequality.…”
Section: Our Resultssupporting
confidence: 88%
“…Interestingly, our bound surpasses that of Azar et al [3] which until very recently was the best known bound for (the full information) prophet secretary. Furthermore, our bound also beats the bound of 1 − 1/e obtained by Correa et al [5] for the i.i.d. single-sample prophet inequality.…”
Section: Our Resultssupporting
confidence: 88%
“…Our algorithm for the secretary problem in the ROS model improves upon recent results by Correa et al [5] for the prophet inequality in the i.i.d. model in which the online player gets access to a limited number of training samples from the (unknown) distribution.…”
Section: Introductionsupporting
confidence: 65%
“…We next prove an upper bound on the competitive-ratio for the problem. A similar asymptotic result was established in [5], we provide here a proof that applies for any n ∈ N. Proof. Fix n, h ∈ N. We consider a classical settings of the secretary problem in which the input to the online player at each online round is only the rank of the arriving candidate among the subsequence of already observed candidates, and the goal is to maximize the probability of accepting the best candidate overall.…”
Section: Proof Bysupporting
confidence: 54%
“…Indeed, for the prophet inequality with i.i.d. values from an unknown distribution (a model that arguable gives more information than ours) Correa et al [9] proved that with O(n 2 ) samples one can achieve the best possible performance guarantee of the case with known distribution, and only very recently Rubinstein et al [23] improved this to O(n) samples. This is in line with our result here since for p close to, but strictly less than 1, the size of the sample set is linear in the size of V .…”
Section: Introductionmentioning
confidence: 94%