Optimal Sequential Selection of a Unimodal Subsequence of a Random Sequence

We consider the problem of selecting sequentially a unimodal subsequence from a sequence of independent identically distributed random variables, and we find that a person doing optimal sequential selection does so within a factor of the square root of two as well as a prophet who knows all of the random observations in advance of any selections. Our analysis applies in fact to selections of subsequences that have d+1 monotone blocks, and, by including the case d=0, our analysis also covers monotone subsequences.

[1]  G. Szekeres,et al.  A combinatorial problem in geometry , 2009 .

[2]  J. B. Robertson,et al.  ‘Wald's Lemma' for sums of order statistics of i.i.d. random variables , 1991, Advances in Applied Probability.

[3]  J. Michael Steele Long unimodal subsequences: a problem of F.R.K. Chung , 1981, Discret. Math..

[4]  Dimitri P. Bertsekas,et al.  Stochastic optimal control : the discrete time case , 2007 .

[5]  J. Doob Stochastic processes , 1953 .

[6]  Fan Chung Graham On Unimodal Subsequences , 1980, J. Comb. Theory, Ser. A.

[7]  Alexander Gnedin,et al.  Sequential selection of an increasing subsequence from a sample of random size , 1999 .

[8]  G. Lugosi,et al.  On Concentration-of-Measure Inequalities , 1998 .

[9]  J. Baik,et al.  On the distribution of the length of the longest increasing subsequence of random permutations , 1998, math/9810105.

[10]  B. Bollobás,et al.  Combinatorics, Geometry and Probability: On the Length of the Longest Increasing Subsequence in a Random Permutation , 1997 .

[11]  Wansoo T. Rhee,et al.  A note on the selection of random variables under a sum constraint , 1991 .

[12]  J. Michael Steele,et al.  Optimal Sequential Selection of a Monotone Sequence From a Random Sample , 1981 .

[13]  F. Delbaen,et al.  Optimal rules for the sequential selection of monotone subsequences of maximum expected length , 2001 .

[14]  F Thomas Bruss,et al.  A Central Limit Theorem for the Optimal Selection Process for Monotone Subsequences of Maximum Expected Length , 2004 .

[15]  Béla Bollobás,et al.  The Height of a Random Partial Order: Concentration of Measure , 1992 .