On the Existence of Hermitian Self-Dual Extended Abelian Group Codes

Abstract

Split group codes are a class of group algebra codes over an abelian group. They were introduced in 2000 by Ding, Kohel and Ling as a generalization of the cyclic duadic codes. For a prime power q and an abelian group G of order n such that n and q are coprime, consider the group algebra Fq2[G*] of Fq2 over the dual group G* of G. We prove that every ideal code in Fq2[G*] whose extended code is Hermitian self-dual is a split group code. We characterize the orders of finite abelian groups G for which an ideal code of Fq2[G*] whose extension is Hermitian self-dual exists and derive asymptotic estimates for the number of non-isomorphic abelian groups with this property.

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