Simple and Optimal Online Contention Resolution Schemes for k-Uniform Matroids

Abstract

We provide a simple (1-O(1k))-selectable Online Contention Resolution Scheme for k-uniform matroids against a fixed-order adversary. If Ai and Gi denote the set of selected elements and the set of realized active elements among the first i (respectively), our algorithm selects with probability 1-1k any active element i such that |Ai-1| + 1 ≤ (1-1k)· E[|Gi|]+k. This implies a (1-O(1k)) prophet inequality against fixed-order adversaries for k-uniform matroids that is considerably simpler than previous algorithms [Ala14, AKW14, JMZ22]. We also prove that no OCRS can be (1-( kk))-selectable for k-uniform matroids against an almighty adversary. This guarantee is matched by the (known) simple greedy algorithm that accepts every active element with probability 1-( kk) [HKS07].