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Two Choice Optimal Stopping

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  • David Assaf
  • Larry Goldstein
  • Ester Samuel-Cahn

Abstract

Let Xn, . . . ,X1 be i.i.d. random variables with distribution function F. A statistician, knowing F, observes the X values sequentially and is given two chances to choose X’s using stopping rules. The statistician’s goal is to stop at a value of X as small as possible. Let V^2 equal the expectation of the smaller of the two values chosen by the statistician when proceeding optimally. We obtain the asymptotic behavior of the sequence V^2 for a large class of F’s belonging to the domain of attraction (for the minimum) D(G^a), where G^a(x) = [1 - exp(-x^a)]I(x >= 0). The results are compared with those for the asymptotic behavior of the classical one choice value sequence V^1, as well as with the “prophet value” sequence E(min{Xn, . . . ,X1}).

Suggested Citation

  • David Assaf & Larry Goldstein & Ester Samuel-Cahn, 2002. "Two Choice Optimal Stopping," Discussion Paper Series dp306, The Federmann Center for the Study of Rationality, the Hebrew University, Jerusalem.
  • Handle: RePEc:huj:dispap:dp306
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    References listed on IDEAS

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    1. Laurens de Haan, 1976. "Sample extremes: an elementary introduction," Statistica Neerlandica, Netherlands Society for Statistics and Operations Research, vol. 30(4), pages 161-172, December.
    2. de Haan, Laurens, 1976. "Sample Extremes: An Elementary Introduction," Econometric Institute Archives 272130, Erasmus University Rotterdam.
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