Title :
Network coding and the model theory of linear information inequalities
Author :
Gomez, Ariel ; Mejia, Carolina ; Montoya, J. Andres
Author_Institution :
Dept. de Mat., Univ. Nac. de Colombia, Medellin, Colombia
Abstract :
Let n ≥ 4, can the entropic region of order n be defined by a finite list of polynomial inequalities? This question was first asked by Chan and Grant. We show that if it were the case one could solve many algorithmic problems coming from Network Coding, Index Coding and Secret Sharing. Unfortunately, it seems that the entropic regions of order larger than four are not semialgebraic. Actually, we guess that it is the case and we provide strong evidence supporting our conjecture.
Keywords :
entropy; network coding; polynomials; algorithmic problems; entropic region; linear information inequalities; network coding; polynomial inequalities; Channel coding; Cramer-Rao bounds; Entropy; Network coding; Polynomials; Random variables; Vectors;
Conference_Titel :
Network Coding (NetCod), 2014 International Symposium on
Conference_Location :
Aalborg
DOI :
10.1109/NETCOD.2014.6892127
