Moments of random sums and Robbins' problem of optimal stopping
Abstract
Robbins' problem of optimal stopping asks one to minimise the expected rank of observation chosen by some nonanticipating stopping rule. We settle a conjecture regarding the value of the stopped variable under the rule optimal in the sense of the 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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