Characterization theorems for extending Goppa codes to cyclic codes (Corresp.)

Several theorems are presented which characterize Goppa codes having the property of becoming cyclic when an overall parity cheek is added. If such a Goppa code has location setL = GF (q^{m})and a Goppa polynomialg(z)that is irreducible overGF(q^{m}), theng(z)must be a quadratic. Goppa codes defined by(z- beta)^{a}and location setLwith cardinalitynsuch thatn+l|q^{m}-1are considered along with their subcodes. A sufficient condition onLis derived for the extended codes to become cyclic. This condition is also necessary whena= 1. The construction ofLfor differentnsatisfying the stated condition is investigated in some detail. Some irreversible Goppa codes have been shown to become cyclic when extended by an overall parity check.