Defining the almost-entropic regions by algebraic inequalities
by Arley Gomez; Carolina Mejia; J. Andres Montoya
International Journal of Information and Coding Theory (IJICOT), Vol. 4, No. 1, 2017

Abstract: 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 semialgebraicity, 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.

Online publication date: Mon, 09-Jan-2017

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