On subfields of the Hermitian function field involving the involution automorphism
A function field over a finite field is called maximal if it achieves the Hasse–Weil bound. Finding possible genera that maximal function fields can achieve has both theoretical interest and practical applications to coding theory and other topics. As a subfield of a maximal function field is also m...
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sg-ntu-dr.10356-1393612023-02-28T20:01:19Z On subfields of the Hermitian function field involving the involution automorphism Ma, Liming Xing, Chaoping School of Physical and Mathematical Sciences Science::Mathematics Hermitian Function Field Maximal Function Fields A function field over a finite field is called maximal if it achieves the Hasse–Weil bound. Finding possible genera that maximal function fields can achieve has both theoretical interest and practical applications to coding theory and other topics. As a subfield of a maximal function field is also maximal, one way to find maximal function fields is to find all subfields of a maximal function field. Due to the large automorphism group of the Hermitian function field, it is natural to find as many subfields of the Hermitian function field as possible. In literature, most of papers studied subfields fixed by subgroups of the decomposition group at one point (usually the point at infinity). This is because it becomes much more complicated to study the subfield fixed by a subgroup that is not contained in the decomposition group at one point. In this paper, we study subfields of the Hermitian function field fixed by subgroups that are not contained in the decomposition group of any point except the cyclic subgroups. It turns out that some new maximal function fields are found. Accepted version 2020-05-19T05:02:53Z 2020-05-19T05:02:53Z 2018 Journal Article Ma, L., & Xing, C. (2019). On subfields of the Hermitian function field involving the involution automorphism. Journal of Number Theory, 198, 293-317. doi:10.1016/j.jnt.2018.10.014 0022-314X https://hdl.handle.net/10356/139361 10.1016/j.jnt.2018.10.014 2-s2.0-85056897883 198 293 317 en Journal of Number Theory © 2018 Elsevier Inc. All rights reserved. This paper was published in Journal of Number Theory and is made available with permission of Elsevier Inc. application/pdf |
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Science::Mathematics Hermitian Function Field Maximal Function Fields Ma, Liming Xing, Chaoping On subfields of the Hermitian function field involving the involution automorphism |
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A function field over a finite field is called maximal if it achieves the Hasse–Weil bound. Finding possible genera that maximal function fields can achieve has both theoretical interest and practical applications to coding theory and other topics. As a subfield of a maximal function field is also maximal, one way to find maximal function fields is to find all subfields of a maximal function field. Due to the large automorphism group of the Hermitian function field, it is natural to find as many subfields of the Hermitian function field as possible. In literature, most of papers studied subfields fixed by subgroups of the decomposition group at one point (usually the point at infinity). This is because it becomes much more complicated to study the subfield fixed by a subgroup that is not contained in the decomposition group at one point. In this paper, we study subfields of the Hermitian function field fixed by subgroups that are not contained in the decomposition group of any point except the cyclic subgroups. It turns out that some new maximal function fields are found. |
| author2 |
School of Physical and Mathematical Sciences |
| author_facet |
School of Physical and Mathematical Sciences Ma, Liming Xing, Chaoping |
| format |
Article |
| author |
Ma, Liming Xing, Chaoping |
| author_sort |
Ma, Liming |
| title |
On subfields of the Hermitian function field involving the involution automorphism |
| title_short |
On subfields of the Hermitian function field involving the involution automorphism |
| title_full |
On subfields of the Hermitian function field involving the involution automorphism |
| title_fullStr |
On subfields of the Hermitian function field involving the involution automorphism |
| title_full_unstemmed |
On subfields of the Hermitian function field involving the involution automorphism |
| title_sort |
on subfields of the hermitian function field involving the involution automorphism |
| publishDate |
2020 |
| url |
https://hdl.handle.net/10356/139361 |
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1759856575377309696 |