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Proceedings of the Twenty-Ninth Annual ACM-SIAM Symposium on Discrete Algorithms

A Framework for the Secretary Problem on the Intersection of Matroids

Abstract

The secretary problem became one of the most prominent online selection problems due to its numerous applications in online mechanism design. The task is to select a maximum weight subset of elements subject to given constraints, where elements arrive one-by-one in random order, revealing a weight upon arrival. The decision whether to select an element has to be taken immediately after its arrival. The different applications that map to the secretary problem ask for different constraint families to be handled. The most prominent ones are matroid constraints, which both capture many relevant settings and admit strongly competitive secretary algorithms. However, dealing with more involved constraints proved to be much more difficult, and strong algorithms are known only for a few specific settings. In this paper, we present a general framework for dealing with the secretary problem over the intersection of several matroids. This framework allows us to combine and exploit the large set of matroid secretary algorithms known in the literature. As one consequence, we get constant-competitive secretary algorithms over the intersection of any constant number of matroids whose corresponding (single-)matroid secretary problems are currently known to have a constant-competitive algorithm. Moreover, we show that our results extend to submodular objectives.

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Published In

cover image Proceedings
Proceedings of the Twenty-Ninth Annual ACM-SIAM Symposium on Discrete Algorithms
Pages: 735 - 752
Editor: Artur Czumaj, University of Warwick, United Kingdom
ISBN (Online): 978-1-61197-503-1

History

Published online: 2 January 2018

Keywords

  1. matroid secretary problem
  2. matroid intersection
  3. online algorithms

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Notes

*
Supported by Israel Science Foundation grant 1357/16, ERC Starting Grant 335288-OptApprox, and Swiss National Science Foundation grant 200021_165866.

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