On the Cost of Non-Adaptivity in Matroid Prophet Inequalities

Abstract

Matroid prophet inequalities admit an optimal 2-competitive algorithm, which relies on adaptively updating thresholds based on previous outcomes. Motivated by applications to posted-price mechanisms and the structural simplicity of fixed-threshold policies, recent work initiated the study of non-adaptive matroid prophet inequalities. The central question is to understand how much the performance deteriorates when thresholds must be fixed in advance. We explore the fundamental limits of non-adaptive algorithms and show new structural barriers and algorithmic insights. We first identify a simple case where non-adaptive algorithms admit a lower bound strictly above 2: for truncated partition matroids where every local partition has rank 1, there is an instance giving a lower bound of ≈ 2.179, and we give a non-adaptive OCRS-style algorithm that exactly matches this ratio. We then show that richer matroid structures can amplify this barrier: we obtain stronger lower bounds of 2.217 for laminar matroids and 3 for graphic matroids, and complement the hardness results with improved upper bounds for these matroids.

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