Optimal Guarantees for Online Selection Over Time

Abstract

Prophet inequalities are a cornerstone in optimal stopping and online decision-making. Traditionally, they involve the sequential observation of n non-negative independent random variables and face irrevocable accept-or-reject choices. The goal is to provide policies that provide a good approximation ratio against the optimal offline solution that can access all the values upfront -- the so-called prophet value. In the prophet inequality over time problem (POT), the decision-maker can commit to an accepted value for τ units of time, during which no new values can be accepted. This creates a trade-off between the duration of commitment and the opportunity to capture potentially higher future values. In this work, we provide best possible worst-case approximation ratios in the IID setting of POT for single-threshold algorithms and the optimal dynamic programming policy. We show a single-threshold algorithm that achieves an approximation ratio of (1+e-2)/2≈ 0.567, and we prove that no single-threshold algorithm can surpass this guarantee. With our techniques, we can analyze simple algorithms using k thresholds and show that with k=3 it is possible to get an approximation ratio larger than ≈ 0.602. Then, for each n, we prove it is possible to compute the tight worst-case approximation ratio of the optimal dynamic programming policy for instances with n values by solving a convex optimization program. A limit analysis of the first-order optimality conditions yields a nonlinear differential equation showing that the optimal dynamic programming policy's asymptotic worst-case approximation ratio is ≈ 0.618. Finally, we extend the discussion to adversarial settings and show an optimal worst-case approximation ratio of ≈ 0.162 when the values are streamed in random order.