DocumentCode
3766025
Title
On the representability of integer polymatroids: Applications in linear code construction
Author
Amir Salimi;Muriel Médard;Shuguang Cui
Author_Institution
Department of Electrical and Computer Engineering, Texas A&
fYear
2015
Firstpage
504
Lastpage
508
Abstract
It has been shown that there is a duality between the linear network coding solution and the entropic vectors induced by collection of subspaces in a vector space over a finite field (dubbed linearly constructed entropic vectors). The region of all linearly constructed vectors, coincides with the set of all representable polymatroids. For any integer polymatroid, there is an associated matroid, which uniquely identifies the polymatroid. We conjecture that the representability of the underlying matroid is a sufficient condition for integer polymatroids to be linearly representable. We prove that the conjecture holds for representation over real numbers. Furthermore, we show that any real-valued submodular function (such as Shannon entropy) can be approximated (arbitrarily close) by an integer polymatroid.
Keywords
"Entropy","Silicon","Xenon","Network coding","Random variables","Electronic mail"
Publisher
ieee
Conference_Titel
Communication, Control, and Computing (Allerton), 2015 53rd Annual Allerton Conference on
Type
conf
DOI
10.1109/ALLERTON.2015.7447046
Filename
7447046
Link To Document