Monomial-like codes

Abstract

As a generalization of cyclic codes of length ps over Fpa, we study n-dimensional cyclic codes of length ps1 X ... X psn over Fpa generated by a single "monomial". Namely, we study multi-variable cyclic codes of the form <(x1 - 1)i1 ... (xn - 1)in> in Fpa[x1...xn] / < x1ps1-1, ..., xnpsn-1 >. We call such codes monomial-like codes. We show that these codes arise from the product of certain single variable codes and we determine their minimum Hamming distance. We determine the dual of monomial-like codes yielding a parity check matrix. We also present an alternative way of constructing a parity check matrix using the Hasse derivative. We study the weight hierarchy of certain monomial like codes. We simplify an expression that gives us the weight hierarchy of these codes.