Prophet Inequality with Conservative Prediction

Abstract

Prophet inequalities compare online stopping strategies against an omniscient "prophet" using distributional knowledge. In this work, we augment this model with a conservative prediction of the maximum realized value. We quantify the quality of this prediction using a parameter α ∈ [0,1], ranging from inaccurate to perfect. Our goal is to improve performance when predictions are accurate (consistency) while maintaining theoretical guarantees when they are not (robustness). We propose a threshold-based strategy oblivious to α (i.e., with α unknown to the algorithm) that matches the classic competitive ratio of 1/2 at α=0 and improves smoothly to 3/4 at α=1. We further prove that simultaneously achieving better than 3/4 at α=1 while maintaining 1/2 at α=0 is impossible. Finally, when α is known in advance, we present a strategy achieving a tight competitive ratio of 12-α.