On non-full-rank perfect codes over finite fields

April 09, 2017 Β· Declared Dead Β· πŸ› Designs, Codes and Cryptography

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Authors Alexander M. Romanov arXiv ID 1704.02627 Category cs.IT: Information Theory Citations 11 Venue Designs, Codes and Cryptography Last Checked 4 months ago
Abstract
The paper deals with the perfect 1-error correcting codes over a finite field with $q$ elements (briefly $q$-ary 1-perfect codes). We show that the orthogonal code to the $q$-ary non-full-rank 1-perfect code of length $n = (q^{m}-1)/(q-1)$ is a $q$-ary constant-weight code with Hamming weight equals to $q^{m - 1}$ where $m$ is any natural number not less than two. We derive necessary and sufficient conditions for $q$-ary 1-perfect codes of non-full rank. We suggest a generalization of the concatenation construction to the $q$-ary case and construct the ternary 1-perfect codes of length 13 and rank 12.
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