On-line partitioning of width w posets into w^O(log log w) chains

September 29, 2018 Β· Declared Dead Β· πŸ› European journal of combinatorics (Print)

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Authors BartΕ‚omiej Bosek, Tomasz Krawczyk arXiv ID 1810.00270 Category cs.DS: Data Structures & Algorithms Citations 7 Venue European journal of combinatorics (Print) Last Checked 4 months ago
Abstract
An on-line chain partitioning algorithm receives the elements of a poset one at a time, and when an element is received, irrevocably assigns it to one of the chains. In this paper, we present an on-line algorithm that partitions posets of width $w$ into $w^{O(\log{\log{w}})}$ chains. This improves over previously best known algorithms using $w^{O(\log{w})}$ chains by Bosek and Krawczyk and by Bosek, Kierstead, Krawczyk, Matecki, and Smith. Our algorithm runs in $w^{O(\sqrt{w})}n$ time, where $w$ is the width and $n$ is the size of a presented poset.
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