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Let Symq (m) be the space of symmetric matrices in Fq^m m. A subspace of Symq (m) equipped with the rank distance is called a symmetric rank-metric code. In this paper we study the covering properties of symmetric rank-metric codes. First we characterize symmetric rank-metric codes which are perfect, i. e. that satisfy the equality in the sphere-packing like bound. We show that, despite the rank-metric case, there are non trivial perfect codes. Also, we characterize families of codes which are quasi-perfect.
Mushrraf et al. (Tue,) studied this question.
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