Moments of random sums and Robbins' problem of optimal stopping
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2011
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Abstract
Robbins' problem of optimal stopping is that of minimising the expected rank of an observation chosen by some nonanticipating stopping rule. We settle a conjecture regarding the value of the stopped variable under the rule that yields the minimal expected rank, by embedding the problem in a much more general context of selection problems with the nonanticipation constraint lifted, and with the payoff growing like a power function of the rank.
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Gnedin, A V & Iksanov, A 2011, 'Moments of random sums and Robbins' problem of optimal stopping', Journal of Applied Probability, vol. 48, no. 4, pp. 1197-1199. https://doi.org/10.1239/jap/1324046028