On a Riemann hypothesis analogue for selfdual weight enumerators of genus less than 3 |
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| Authors: | Shigeto Nishimura |
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| Affiliation: | Department of Systems and Control Engineering, College of Engineering, Hosei University, Koganei, Tokyo, 184-8584, Japan |
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| Abstract: | In this contribution the Riemann hypothesis analogue presented by Iwan Duursma is considered. Whether the analogue for a given selfdual code holds depends on its Hamming weight enumerator. A necessary and sufficient condition is provided in the case of genus less than 3 for the homogeneous polynomials in two variables invariant under the MacWilliams transform. Also the case of half integral genus is studied and similar results are obtained. |
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| Keywords: | Zeta function for linear codes Riemann hypothesis analogue |
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