Equivariant theory for codes and lattices I
Abstract
In this paper, we present a generalization of Hayden's theorem [7, Theorem 4.2] for G-codes over finite Frobenius rings. A lattice theoretical form of this generalization is also given. Moreover, Astumi's MacWilliams identity [1, Theorem 1] is generalized in several ways for different weight enumerators of G-codes over finite Frobenius rings. Furthermore, we provide the Jacobi analogue of Astumi's MacWilliams identity for G-codes over finite Frobenius rings. Finally, we study the relation between G-codes and its corresponding G-lattices.
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