The capacity of a finite field matrix channel

Abstract

The Additive-Multiplicative Matrix Channel (AMMC) was introduced by Silva, Kschischang and K\"otter in 2010 to model data transmission using random linear network coding. The input and output of the channel are n× m matrices over a finite field Fq. On input the matrix X, the channel outputs Y=A(X+W) where A is a uniformly chosen n× n invertible matrix over Fq and where W is a uniformly chosen n× m matrix over Fq of rank t. Silva et al considered the case when 2n≤ m. They determined the asymptotic capacity of the AMMC when t, n and m are fixed and q→∞. They also determined the leading term of the capacity when q is fixed, and t, n and m grow linearly. We generalise these results, showing that the condition 2n≥ m can be removed. (Our formula for the capacity falls into two cases, one of which generalises the 2n≥ m case.) We also improve the error term in the case when q is fixed.