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Main Authors: Filho, Gilberto B. Almeida, Tafazolian, Saeed, Vieira, Stéfani C.
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2508.12959
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author Filho, Gilberto B. Almeida
Tafazolian, Saeed
Vieira, Stéfani C.
author_facet Filho, Gilberto B. Almeida
Tafazolian, Saeed
Vieira, Stéfani C.
contents We establish a rigidity phenomenon for a family of intermediate covers of the Skabelund curve over $\mathbb{F}_{q^4}$. The Skabelund curve, introduced by D.~Skabelund as a cyclic cover of the Suzuki curve, is a maximal curve with a large automorphism group and plays a central role in the theory of maximal curves over finite fields. For the intermediate covers arising from this construction, we determine their full automorphism groups and compute the Weierstrass semigroups at all $\mathbb{F}_{q^4}$-rational points. Using these structural and arithmetic invariants, we prove that each curve in the family is uniquely determined, up to isomorphism over its field of definition, by the pair consisting of its genus and its full automorphism group. This provides a rigidity-type classification of intermediate Suzuki-type covers; in particular, the Skabelund curve itself is uniquely characterized within this family by its genus and automorphism group.
format Preprint
id arxiv_https___arxiv_org_abs_2508_12959
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Maximal Subcovers of the Skabelund Curve: Uniqueness via Genus and Automorphism Groups
Filho, Gilberto B. Almeida
Tafazolian, Saeed
Vieira, Stéfani C.
Algebraic Geometry
We establish a rigidity phenomenon for a family of intermediate covers of the Skabelund curve over $\mathbb{F}_{q^4}$. The Skabelund curve, introduced by D.~Skabelund as a cyclic cover of the Suzuki curve, is a maximal curve with a large automorphism group and plays a central role in the theory of maximal curves over finite fields. For the intermediate covers arising from this construction, we determine their full automorphism groups and compute the Weierstrass semigroups at all $\mathbb{F}_{q^4}$-rational points. Using these structural and arithmetic invariants, we prove that each curve in the family is uniquely determined, up to isomorphism over its field of definition, by the pair consisting of its genus and its full automorphism group. This provides a rigidity-type classification of intermediate Suzuki-type covers; in particular, the Skabelund curve itself is uniquely characterized within this family by its genus and automorphism group.
title Maximal Subcovers of the Skabelund Curve: Uniqueness via Genus and Automorphism Groups
topic Algebraic Geometry
url https://arxiv.org/abs/2508.12959