Proceedings of the Forty-Sixth Annual ACM Symposium on Theory of Computing 2014
DOI: 10.1145/2591796.2591810
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Primal beats dual on online packing LPs in the random-order model

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Cited by 85 publications
(119 citation statements)
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“…Over the last years the framework has received quite some research interest and many further problems have been studied. These include generalized secretary problems [2,3,13,28,29], the knapsack problem [2,28], bin packing [26], facility location [31], matching problems [17,22,30], packing LPs [27] and convex optimization [20].…”
Section: Introductionmentioning
confidence: 99%
“…Over the last years the framework has received quite some research interest and many further problems have been studied. These include generalized secretary problems [2,3,13,28,29], the knapsack problem [2,28], bin packing [26], facility location [31], matching problems [17,22,30], packing LPs [27] and convex optimization [20].…”
Section: Introductionmentioning
confidence: 99%
“…Random Order Model: There has been a line of work in analyzing online algorithms in the random order model for matching problems and more general packing integer linear programs [10,12,26,1,11,20,14]. These algorithms are usually based off of some sort of primaldual approach.…”
Section: Related Workmentioning
confidence: 99%
“…Our construction borrows techniques used in designing online algorithms for stochastic online convex programming problems (Agrawal and Devanur, 2015;Chen and Wang, 2013), and stochastic online packing problems (Agrawal et al, 2009;Devanur et al, 2011;Badanidiyuru et al, 2013;Kesselheim et al, 2014). Our online algorithm (Algorithm 4, below) considers the replicas in order, updates the dual variables using multiplicative weight updates based on the current allocation, and allocates to each agent by sampling from the exponential weights distribution as given by Lemma 5.3.…”
Section: Online Entropy Regularized Matchingmentioning
confidence: 99%