An Improved Lower Bound for Matroid Intersection Prophet Inequalities

Abstract

We consider prophet inequalities subject to feasibility constraints that are the intersection of q matroids. The best-known algorithms achieve a (q)-approximation, even when restricted to instances that are the intersection of q partition matroids, and with i.i.d.~Bernoulli random variables. The previous best-known lower bound is (q) due to a simple construction of [Kleinberg-Weinberg STOC 2012] (which uses i.i.d.~Bernoulli random variables, and writes the construction as the intersection of partition matroids). We establish an improved lower bound of q1/2+(1/ q) by writing the construction of [Kleinberg-Weinberg STOC 2012] as the intersection of asymptotically fewer partition matroids. We accomplish this via an improved upper bound on the product dimension of a graph with pp disjoint cliques of size p, using recent techniques developed in [Alon-Alweiss European Journal of Combinatorics 2020].