Extremal invariant polynomials not satisfying the Riemann hypothesis

Zeta functions for linear codes were defined by Iwan Duursma in 1999. They were generalized to the case of some invariant polynomials by the preset author. One of the most important problems is whether extremal weight enumerators satisfy the Riemann hypothesis. In this article, we show there exist e...

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Bibliographic Details
Published inarXiv.org
Main Author Chinen, Koji
Format Paper
LanguageEnglish
Published Ithaca Cornell University Library, arXiv.org 11.09.2017
Subjects
Hypotheses
Invariants
Mathematical analysis
Polynomials
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Summary:Zeta functions for linear codes were defined by Iwan Duursma in 1999. They were generalized to the case of some invariant polynomials by the preset author. One of the most important problems is whether extremal weight enumerators satisfy the Riemann hypothesis. In this article, we show there exist extremal polynomials of the weight enumerator type which are invariant under the MacWilliams transform and do not satisfy the Riemann hypothesis.
ISSN:2331-8422