Sorting nine inputs requires twenty-five comparisons

Michael Codish; Luis Cruz-Filipe; Michael Frank; Peter Schneider-Kamp

doi:10.1016/j.jcss.2015.11.014

Sorting nine inputs requires twenty-five comparisons

Michael Codish
, Luis Cruz-Filipe
, Michael Frank
, Peter Schneider-Kamp

Research output: Journal Article or Conference Article in Journal › Journal article › Research › peer-review

Abstract

This paper describes a computer-assisted non-existence proof of 9-input sorting networks consisting of 24 comparators, hence showing that the 25-comparator sorting network found by Floyd in 1964 is optimal. As a corollary, the 29-comparator network found by Waksman in 1969 is optimal when sorting 10 inputs. This closes the two smallest open instances of the optimal-size sorting network problem, which have been open since the results of Floyd and Knuth from 1966 proving optimality for sorting networks of up to 8 inputs.

Original language	English
Journal	Journal of Computer and System Sciences
Volume	82
Issue number	3
Pages (from-to)	551-563
Number of pages	13
ISSN	0022-0000
DOIs	https://doi.org/10.1016/j.jcss.2015.11.014
Publication status	Published - 2016
Externally published	Yes

Keywords

Symmetry breaking

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10.1016/j.jcss.2015.11.014

Cite this

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title = "Sorting nine inputs requires twenty-five comparisons",

abstract = "This paper describes a computer-assisted non-existence proof of 9-input sorting networks consisting of 24 comparators, hence showing that the 25-comparator sorting network found by Floyd in 1964 is optimal. As a corollary, the 29-comparator network found by Waksman in 1969 is optimal when sorting 10 inputs. This closes the two smallest open instances of the optimal-size sorting network problem, which have been open since the results of Floyd and Knuth from 1966 proving optimality for sorting networks of up to 8 inputs.",

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AU - Codish, Michael

AU - Cruz-Filipe, Luis

AU - Frank, Michael

AU - Schneider-Kamp, Peter

PY - 2016

Y1 - 2016

N2 - This paper describes a computer-assisted non-existence proof of 9-input sorting networks consisting of 24 comparators, hence showing that the 25-comparator sorting network found by Floyd in 1964 is optimal. As a corollary, the 29-comparator network found by Waksman in 1969 is optimal when sorting 10 inputs. This closes the two smallest open instances of the optimal-size sorting network problem, which have been open since the results of Floyd and Knuth from 1966 proving optimality for sorting networks of up to 8 inputs.

AB - This paper describes a computer-assisted non-existence proof of 9-input sorting networks consisting of 24 comparators, hence showing that the 25-comparator sorting network found by Floyd in 1964 is optimal. As a corollary, the 29-comparator network found by Waksman in 1969 is optimal when sorting 10 inputs. This closes the two smallest open instances of the optimal-size sorting network problem, which have been open since the results of Floyd and Knuth from 1966 proving optimality for sorting networks of up to 8 inputs.

KW - Symmetry breaking

U2 - 10.1016/j.jcss.2015.11.014

DO - 10.1016/j.jcss.2015.11.014

M3 - Journal article

SN - 0022-0000

VL - 82

SP - 551

EP - 563

JO - Journal of Computer and System Sciences

JF - Journal of Computer and System Sciences

IS - 3

ER -

Sorting nine inputs requires twenty-five comparisons

Abstract

Keywords

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