Only One Nonlinear Non-Shannon Inequality is Necessary for Four Variables

Liu, Yunshu; Walsh, John MacLaren

doi:10.3390/ecea-2-b007

“…There is a recent result of Liu and Walsh (2015) claiming that the almost-entropic region of order 4 can be defined by a single non-linear inequality. This result seems to refute our conjecture that this region is not semialgebraic.…”

mentioning

confidence: 99%

Defining the almost-entropic regions by algebraic inequalities

Montoya

¹

,

Mejía

²

,

Gomez

³

2017

IJICOT

0

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We study the definability of the almost-entropic regions by finite lists of algebraic inequalities. First, we study linear information inequalities and polyhedrality, we present a proof of a theorem of Matus, which claims that the almost-entropic regions are not polyhedral. Then, we study polynomial inequalities and semilagebraicity, we show that the semialgebracity of the almost-entropic regions is something that depends on the essentially conditionality of a certain class of conditional information inequalities. Those results suggest that the almost-entropic regions are not semialgebraic. We conjecture that those regions are not decidable.

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Exact repair problems with multiple sources

Apte

¹

,

Li

²

,

Walsh

³

et al. 2014

2014 48th Annual Conference on Information Sciences and Systems (CISS)

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We consider a new variant of the exact repair distributed storage problem, the multi-source exact repair problem, wherein the reconstruction decoders are each only required to provide a subset of the source variables. To best illustrate the idea, we generalize the (n, k, d) = (3, 2, 2) exact repair distributed storage problem to the multisource case. When every decoder demands all source variables, the rate region of the (3, 2, 2) exact repair problem is known to be same as that of the (3, 2, 2) functional repair problem, while the rate region for (3, 2, 2) case with multiple sources is unknown. We find achievable rate regions for vector binary and scalar binary codes via an automated approach.

show abstract

Defining the almost-entropic regions by algebraic inequalities

Gomez

¹

,

Mejía

²

,

Montoya

³

2017

IJICOT

View full text Add to dashboard Cite

We study the definability of the almost-entropic regions by finite lists of algebraic inequalities. First, we study linear information inequalities and polyhedrality, we present a proof of a theorem of Matus, which claims that the almost-entropic regions are not polyhedral. Then, we study polynomial inequalities and semilagebraicity, we show that the semialgebracity of the almost-entropic regions is something that depends on the essentially conditionality of a certain class of conditional information inequalities. Those results suggest that the almost-entropic regions are not semialgebraic. We conjecture that those regions are not decidable.

show abstract

Only One Nonlinear Non-Shannon Inequality is Necessary for Four Variables

Cited by 3 publications

References 19 publications

Defining the almost-entropic regions by algebraic inequalities

Defining the almost-entropic regions by algebraic inequalities

Exact repair problems with multiple sources

Defining the almost-entropic regions by algebraic inequalities

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