Twisted Centralizer Codes

Abstract

Given an n× n matrix A over a field F and a scalar a∈ F, we consider the linear codes C(A,a):=\B∈ Fn× n \,AB=aBA\ of length n2. We call C(A,a) a twisted centralizer code. We investigate properties of these codes including their dimensions, minimum distances, parity-check matrices, syndromes, and automorphism groups. The minimal distance of a centralizer code (when a=1) is at most n, however for a 0,1 the minimal distance can be much larger, as large as n2.