Groups and information inequalities in 5 variables
Linear rank inequalities in 4 subspaces are characterized by Shannon-type inequalities and the Ingleton inequality in 4 random variables. Examples of random variables violating these inequalities have been found using finite groups, and are of interest for their applications in nonlinear network cod...
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2014
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sg-ntu-dr.10356-972962023-02-28T19:17:19Z Groups and information inequalities in 5 variables Markin, Nadya Thomas, Eldho Oggier, Frederique School of Physical and Mathematical Sciences Annual Allerton Conference on Communication, Control, and Computing (51st : 2013 : Monticello, USA) DRNTU::Science::Mathematics::Algebra Linear rank inequalities in 4 subspaces are characterized by Shannon-type inequalities and the Ingleton inequality in 4 random variables. Examples of random variables violating these inequalities have been found using finite groups, and are of interest for their applications in nonlinear network coding [1]. In particular, it is known that the symmetric group S5 provides the first instance of a group, which gives rise to random variables that violate the Ingleton inequality. In the present paper, we use group theoretic methods to construct random variables which violate linear rank inequalities in 5 random variables. In this case, linear rank inequalities are fully characterized [8] using Shannon-type inequalities together with 4 Ingleton inequalities and 24 additional new inequalities. We show that finite groups which do not produce violators of the Ingleton inequality in 4 random variables will also not violate the Ingleton inequalities for 5 random variables. We then focus on 2 of the 24 additional inequalities in 5 random variables and formulate conditions for finite groups which help us eliminate those groups that obey the 2 inequalities. In particular, we show that groups of order pq, where p; q are prime, always satisfy them, and exhibit the first violator, which is the symmetric group S4. Accepted version 2014-02-27T04:11:03Z 2019-12-06T19:41:03Z 2014-02-27T04:11:03Z 2019-12-06T19:41:03Z 2013 2013 Conference Paper Markin, N., Thomas, E., & Oggier, F. (2013). Groups and information inequalities in 5 variables. 2013 51st Annual Allerton Conference on Communication, Control, and Computing (Allerton), 804 - 809. https://hdl.handle.net/10356/97296 http://hdl.handle.net/10220/18867 10.1109/Allerton.2013.6736607 174431 en © 2013 IEEE. This is the author created version of a work that has been peer reviewed and accepted for publication by 2013 51st Annual Allerton Conference on Communication, Control, and Computing (Allerton), IEEE. It incorporates referee’s comments but changes resulting from the publishing process, such as copyediting, structural formatting, may not be reflected in this document. The published version is available at: [DOI:http://dx.doi.org/10.1109/Allerton.2013.6736607]. application/pdf |
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DRNTU::Science::Mathematics::Algebra Markin, Nadya Thomas, Eldho Oggier, Frederique Groups and information inequalities in 5 variables |
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Linear rank inequalities in 4 subspaces are characterized by Shannon-type inequalities and the Ingleton inequality in 4 random variables. Examples of random variables violating these inequalities have been found using finite groups, and are of interest for their applications in nonlinear network coding [1]. In particular, it is known that the symmetric group S5 provides the first instance of a group, which gives rise to random variables that violate the Ingleton inequality. In the present paper, we use group theoretic methods to construct random variables which violate linear rank inequalities in 5 random variables. In this case, linear rank inequalities are fully characterized [8] using Shannon-type inequalities together with 4 Ingleton inequalities and 24 additional new inequalities. We show that finite groups which do not produce violators of the Ingleton inequality in 4 random variables will also not violate the Ingleton inequalities for 5 random variables. We then focus on 2 of the 24 additional inequalities in 5 random variables and formulate conditions for finite groups which help us eliminate those groups that obey the 2 inequalities. In particular, we show that groups of order pq, where p; q are prime, always satisfy them, and exhibit the first violator, which is the symmetric group S4. |
| author2 |
School of Physical and Mathematical Sciences |
| author_facet |
School of Physical and Mathematical Sciences Markin, Nadya Thomas, Eldho Oggier, Frederique |
| format |
Conference or Workshop Item |
| author |
Markin, Nadya Thomas, Eldho Oggier, Frederique |
| author_sort |
Markin, Nadya |
| title |
Groups and information inequalities in 5 variables |
| title_short |
Groups and information inequalities in 5 variables |
| title_full |
Groups and information inequalities in 5 variables |
| title_fullStr |
Groups and information inequalities in 5 variables |
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Groups and information inequalities in 5 variables |
| title_sort |
groups and information inequalities in 5 variables |
| publishDate |
2014 |
| url |
https://hdl.handle.net/10356/97296 http://hdl.handle.net/10220/18867 |
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1759853966912389120 |