A new extension theorem for linear codes |
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| Authors: | Tatsuya Maruta |
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| Affiliation: | Department of Applied Mathematics, Osaka Women's University, Daisen-cho, Sakai, Osaka 590-0035, Japan |
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| Abstract: | For an [n,k,d]q code with k3, gcd(d,q)=1, the diversity of is defined as the pair (Φ0,Φ1) withAll the diversities for [n,k,d]q codes with k3, d−2 (mod q) such that Ai=0 for all i0,−1,−2 (mod q) are found and characterized with their spectra geometrically, which yields that such codes are extendable for all odd q5. Double extendability is also investigated. |
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| Keywords: | Extension of linear codes Projective geometry over GF(q) Diversity |
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