Jacobi forms over number fields from linear codes-Reference-Cited by-同舟云学术

Jacobi forms over number fields from linear codes

Published:2022 Issue:5 Volume:7 Page:8235-8249
ISSN:2473-6988
Container-title:AIMS Mathematics
language:
Short-container-title:MATH

Author:

Kim Boran, ,Kim Chang Heon,Kwon Soonhak,Kwon Yeong-Wook, ,

Abstract

<abstract><p>We suggest a Jacobi form over a number field $ \Bbb Q(\sqrt 5, i) $; for obtaining this, we use a linear code $ C $ over $ R: = \Bbb F_4+u\Bbb F_4 $, where $ u^2 = 0 $. We introduce MacWilliams identities for both complete weight enumerator and symmetrized weight enumerator in higher genus $ g\ge 1 $ of a linear code over $ R $. Finally, we give invariants via a self-dual code of even length over $ R $.</p></abstract>

Publisher

American Institute of Mathematical Sciences (AIMS)

Subject

General Mathematics

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