Abstract
In this article we explicitly determine the Weierstrass semigroup at any point and the full automorphism group of a known
-maximal curve
having the third largest genus. This curve arises as a Galois subcover of the Hermitian curve, and its uniqueness (with respect to the value of its genus) is a well-known open problem. Knowing the Weierstrass semigroups may provide a key towards solving this problem. Surprisingly enough
has many different types of Weierstrass semigroups and the set of its Weierstrass points is much richer than its set of
-rational points. This makes the curve
the first explicitly known maximal curve having non-rational Weierstrass points. We show that a similar exceptional behaviour does not occur in terms of automorphisms, that is,
is exactly the automorphism group inherited from the Hermitian curve, apart from small values of q.
-maximal curve
having the third largest genus. This curve arises as a Galois subcover of the Hermitian curve, and its uniqueness (with respect to the value of its genus) is a well-known open problem. Knowing the Weierstrass semigroups may provide a key towards solving this problem. Surprisingly enough
has many different types of Weierstrass semigroups and the set of its Weierstrass points is much richer than its set of
-rational points. This makes the curve
the first explicitly known maximal curve having non-rational Weierstrass points. We show that a similar exceptional behaviour does not occur in terms of automorphisms, that is,
is exactly the automorphism group inherited from the Hermitian curve, apart from small values of q.
| Original language | English |
|---|---|
| Article number | 102300 |
| Number of pages | 39 |
| Journal | Finite fields and their applications |
| Volume | 92 |
| DOIs | |
| Publication status | Published - Dec-2023 |
| Externally published | Yes |