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 X1, . . . , Xn 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 have E[Xτ ] ≥ α · E[maxt Xt ]. What makes this problem challenging is that the decision whether τ = t may only depend on the values of the random variables X1, . . . , Xt and on the distribution F . For a long time the best known bound for the problem had been α ≥ 1 − 1/e ≈ 0.632, but quite recently a tight bound of α ≈ 0.745 was obtained. The case where F is unknown, such that the decision whether τ = t may de...
AbstractGeneralizations of prophet inequalities for single sequences are obtained for optimal stoppi...
Let X1,X2,... be any sequence of nonnegative integrable random vari-ables, and let N ∈ {1, 2,...} be...
AbstractLet X1, …, Xn be a sequence of independent [0, 1]-valued random variables and let 0 < β ≤ 1....
A central object of study in optimal stopping theory is the single-choice prophet inequality for ind...
A central object of study in optimal stopping theory is the single-choice prophet inequality for ind...
In a prophet inequality problem, $n$ independent random variables are presented to a gambler one by ...
A prophet inequality states, for some α ∈ [0, 1], that the expected value achievable by a gambler wh...
AbstractFor independent non-negative random variables {Xn, n ≥ 1} let υr = sup E(Xτ1+⋯+Xτ), where th...
AbstractComparisons are made between the expected gain of a prophet (an observer with complete fores...
In posted pricing, one defines prices for items (or other outcomes), buyers arrive in some order and...
1980 Mathematics Subject Classification: Primary 60G40.It is demonstrated that for each n \ge 2 ther...
A prophet inequality states, for some α ∈ [0, 1], that the expected value achievable by a gambler wh...
The classic prophet inequality states that, when faced with a finite sequence of non-negative indepe...
Let X 1 , X 2 , . . . be any sequence of [0, 1]-valued random variables. A complete comparison is ma...
Prophet inequalities for rewards maximization are fundamental to optimal stopping theory with severa...
AbstractGeneralizations of prophet inequalities for single sequences are obtained for optimal stoppi...
Let X1,X2,... be any sequence of nonnegative integrable random vari-ables, and let N ∈ {1, 2,...} be...
AbstractLet X1, …, Xn be a sequence of independent [0, 1]-valued random variables and let 0 < β ≤ 1....
A central object of study in optimal stopping theory is the single-choice prophet inequality for ind...
A central object of study in optimal stopping theory is the single-choice prophet inequality for ind...
In a prophet inequality problem, $n$ independent random variables are presented to a gambler one by ...
A prophet inequality states, for some α ∈ [0, 1], that the expected value achievable by a gambler wh...
AbstractFor independent non-negative random variables {Xn, n ≥ 1} let υr = sup E(Xτ1+⋯+Xτ), where th...
AbstractComparisons are made between the expected gain of a prophet (an observer with complete fores...
In posted pricing, one defines prices for items (or other outcomes), buyers arrive in some order and...
1980 Mathematics Subject Classification: Primary 60G40.It is demonstrated that for each n \ge 2 ther...
A prophet inequality states, for some α ∈ [0, 1], that the expected value achievable by a gambler wh...
The classic prophet inequality states that, when faced with a finite sequence of non-negative indepe...
Let X 1 , X 2 , . . . be any sequence of [0, 1]-valued random variables. A complete comparison is ma...
Prophet inequalities for rewards maximization are fundamental to optimal stopping theory with severa...
AbstractGeneralizations of prophet inequalities for single sequences are obtained for optimal stoppi...
Let X1,X2,... be any sequence of nonnegative integrable random vari-ables, and let N ∈ {1, 2,...} be...
AbstractLet X1, …, Xn be a sequence of independent [0, 1]-valued random variables and let 0 < β ≤ 1....