Equivalence of Families of Polycyclic Codes over Finite Fields

Abstract

We study the equivalence of families of polycyclic codes associated with polynomials of the form xn - an-1xn-1 - … - a1x - a0 over a finite field. We begin with the specific case of polycyclic codes associated with a trinomial xn - a x - a0 (for some 0< <n), which we refer to as -trinomial codes, after which we generalize our results to general polycyclic codes. We introduce an equivalence relation called n-equivalence, which extends the known notion of n-equivalence for constacyclic codes Chen2014. We compute the number of n-equivalence classes %, N(n,), for this relation and provide conditions under which two families of polycyclic (or -trinomial) codes are equivalent. In particular, we prove that when (n, n-) = 1, any -trinomial code family is equivalent to a trinomial code family associated with the polynomial xn - x - 1. Finally, we focus on p-trinomial codes of length p+r, where p is the characteristic of Fq and r an integer, and provide some examples as an application of the theory developed in this paper.