On the parameters of intertwining codes

Abstract

Let F be a field and let Fr× s denote the space of r× s matrices over F. Given equinumerous subsets A=\Ai i ∈ I\⊂eq Fr× r and B=\Bi i∈ I\⊂eq Fs× s we call the subspace C(A,B):=\X∈ Fr× s AiX=XBi\ for \ i∈ I\ an intertwining code. We show that if C(A,B)\0\, then for each i∈ I, the characteristic polynomials of Ai and Bi and share a nontrivial factor. We give an exact formula for k=(C(A,B)) and give upper and lower bounds. This generalizes previous work in this area. Finally we construct intertwining codes with large minimum distance when the field is not `too small'. We give examples of codes where d=rs/k=1/R is large where the minimum distance, dimension, and rate of the linear code C(A,B) by d, k, and R=k/rs, respectively.