Finite nilpotent and metacyclic groups never violate the Ingleton inequality
In [5], Mao and Hassibi started the study of finite groups that violate the Ingleton inequality. They found through computer search that the smallest group that does violate it is the symmetric group of order 120. We give a general condition that proves that a group does not violate the Ingleton ine...
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sg-ntu-dr.10356-947962023-02-28T19:17:16Z Finite nilpotent and metacyclic groups never violate the Ingleton inequality Stancu, Radu Oggier, Frederique School of Physical and Mathematical Sciences International Symposium on Network Coding (2012 : Cambridge, US) DRNTU::Science::Mathematics In [5], Mao and Hassibi started the study of finite groups that violate the Ingleton inequality. They found through computer search that the smallest group that does violate it is the symmetric group of order 120. We give a general condition that proves that a group does not violate the Ingleton inequality, and consequently deduce that finite nilpotent and metacyclic groups never violate the inequality. In particular, out of the groups of order up to 120, we give a proof that about 100 orders cannot provide groups which violate the Ingleton inequality. Accepted version 2012-08-22T04:11:03Z 2019-12-06T19:02:26Z 2012-08-22T04:11:03Z 2019-12-06T19:02:26Z 2012 2012 Conference Paper Stancu, R., & Oggier, F. (2012). Finite nilpotent and metacyclic groups never violate the Ingleton inequality. 2012 International Symposium on Network Coding (NetCod), pp.25- 30. https://hdl.handle.net/10356/94796 http://hdl.handle.net/10220/8415 10.1109/NETCOD.2012.6261879 164706 en © 2012 IEEE. Personal use of this material is permitted. Permission from IEEE must be obtained for all other uses, in any current or future media, including reprinting/republishing this material for advertising or promotional purposes, creating new collective works, for resale or redistribution to servers or lists, or reuse of any copyrighted component of this work in other works. The published version is available at: [DOI: http://dx.doi.org/10.1109/NETCOD.2012.6261879]. application/pdf |
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DRNTU::Science::Mathematics Stancu, Radu Oggier, Frederique Finite nilpotent and metacyclic groups never violate the Ingleton inequality |
| description |
In [5], Mao and Hassibi started the study of finite groups that violate the Ingleton inequality. They found through computer search that the smallest group that does violate it is the symmetric group of order 120. We give a general condition that proves that a group does not violate the Ingleton inequality, and consequently deduce that finite nilpotent and metacyclic groups never violate the inequality. In particular, out of the groups of order up to 120, we give a proof that about 100 orders cannot provide groups which violate the Ingleton inequality. |
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School of Physical and Mathematical Sciences |
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School of Physical and Mathematical Sciences Stancu, Radu Oggier, Frederique |
| format |
Conference or Workshop Item |
| author |
Stancu, Radu Oggier, Frederique |
| author_sort |
Stancu, Radu |
| title |
Finite nilpotent and metacyclic groups never violate the Ingleton inequality |
| title_short |
Finite nilpotent and metacyclic groups never violate the Ingleton inequality |
| title_full |
Finite nilpotent and metacyclic groups never violate the Ingleton inequality |
| title_fullStr |
Finite nilpotent and metacyclic groups never violate the Ingleton inequality |
| title_full_unstemmed |
Finite nilpotent and metacyclic groups never violate the Ingleton inequality |
| title_sort |
finite nilpotent and metacyclic groups never violate the ingleton inequality |
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2012 |
| url |
https://hdl.handle.net/10356/94796 http://hdl.handle.net/10220/8415 |
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1759853930179723264 |