We show that the matroid secretary problem is equivalent to correlated contention resolution in the online random-order model. Specifically, the matroid secretary conjecture is true if and only if every matroid admits an online random-order contention resolution scheme which, given an arbitrary (possibly correlated) prior distribution over subsets of the ground set, matches the balance ratio of the best offline scheme for that distribution up to a constant. We refer to such a scheme as universal. Our result indicates that the core challenge of the matroid secretary problem lies in resolving contention for positively correlated inputs, in particular when the positive correlation is benign in as much as offline contention resolution is concerned. Our result builds on our previous work which establishes one direction of this equivalence, namely that the secretary conjecture implies universal random-order contention resolution, as well as a weak converse, which derives a matroid secretary algorithm from a random-order contention resolution scheme with only partial knowledge of the distribution. It is this weak converse that we strengthen in this paper: We show that universal random-order contention resolution for matroids, in the usual setting of a fully known prior distribution, suffices to resolve the matroid secretary conjecture in the affirmative. Our proof is the composition of three reductions. First, we use duality arguments to reduce the matroid secretary problem to the matroid prophet secretary problem with arbitrarily correlated distributions. Second, we introduce a generalization of contention resolution we term labeled contention resolution, to which we reduce the correlated matroid prophet secretary problem. Finally, we combine duplication of elements with limiting arguments to reduce labeled contention resolution to classical contention resolution.


翻译:我们显示,机器人秘书问题相当于在线随机序列模型中相关争议的解决。 具体地说,只有当每个机器人秘书都接受在线随机序列争议解决办法,而考虑到在地面集子集上任意(可能相关)先前分配的比重,与该分配的最佳离线计划至常数的平衡比率相匹配,我们称之为通用计划。我们的结果表明,机器人秘书问题的核心挑战在于解决正相关投入的争议,特别是当正相关在离线争议解决方案方面是良性的时。我们的结果建立在我们以前确定这一等值的一个方向的工作之上,即秘书假设意味着普遍随机争议解决,以及一个薄弱的对口,它从随机分配的最佳离线机制中得出一个最优离线的平衡比率。我们称之为通用分配办法。我们在这个文件中强化了这种薄弱的对口:我们显示,正相关正相关正相关关联是通用的、在通常的先前分配情况下,正正相关要素建立在我们先前设定的一个方向上,即秘书假设意味着普遍随机性争议的比值,我们用正值来降低正值的比值。

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