Galois Hulls of Linear Codes over Finite Fields

Abstract

The -Galois hull h(C) of an [n,k] linear code C over a finite field Fq is the intersection of C and C, where C denotes the -Galois dual of C which introduced by Fan and Zhang (2017). The - Galois LCD code is a linear code C with h(C) = 0. In this paper, we show that the dimension of the -Galois hull of a linear code is invariant under permutation equivalence and we provide a method to calculate the dimension of the -Galois hull by the generator matrix of the code. Moreover, we obtain that the dimension of the -Galois hulls of ternary codes are also invariant under monomial equivalence. %The dimension of l-Galois hull of a code is not invariant under monomial equivalence if q>4. We show that every [n,k] linear code over Fq is monomial equivalent to an -Galois LCD code for any q>4. We conclude that if there exists an [n,k] linear code over Fq for any q>4, then there exists an -Galois LCD code with the same parameters for any 0 e-1, where q=pe for some prime p. As an application, we characterize the -Galois hull of matrix product codes over finite fields.