Monimial Matrix Analogue of Yoshida's theorem

Abstract

In this paper, we study variants of weight enumerators of linear codes over Fq. We generalize the concept of average complete joint weight enumerators of two linear codes over Fq. We also give its MacWilliams type identities. Then we establish a monomial analogue of Yoshida's theorem for this average complete joint weight enumerators. Finally, we present the generalized representation for average of g-fold complete joint weight enumerators for Fq-linear codes and establish a monomial matrix analogue of Yoshida's theorem for average g-fold complete joint weight enumerators.

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