On the Existence of Galois Self-Dual GRS and TGRS Codes

Abstract

Let q=pm be a prime power and e be an integer with 0≤ e≤ m-1. e-Galois self-dual codes are generalizations of Euclidean (e=0) and Hermitian (e=m2 with even m) self-dual codes. In this paper, for a linear code and a nonzero vector u∈ qn, we give a sufficient and necessary condition for the dual extended code [u] of to be e-Galois self-orthogonal. From this, a new systematic approach is proposed to prove the existence of e-Galois self-dual codes. By this method, we prove that e-Galois self-dual (extended) generalized Reed-Solomon (GRS) codes of length n>\pe+1,pm-e+1\ do not exist, where 1≤ e≤ m-1. Moreover, based on the non-GRS properties of twisted GRS (TGRS) codes, we show that in many cases e-Galois self-dual (extended) TGRS codes do not exist. Furthermore, we present a sufficient and necessary condition for ()-TGRS codes to be Hermitian self-dual, and then construct several new classes of Hermitian self-dual (+)-TGRS and ()-TGRS codes.