1. An 𝔽p2-maximal Wiman sextic and its automorphisms.
- Author
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Giulietti, Massimo, Kawakita, Motoko, Lia, Stefano, and Montanucci, Maria
- Subjects
- *
AUTOMORPHISM groups , *FINITE fields , *UNITARY groups , *POLYNOMIALS , *EQUATIONS , *AUTOMORPHISMS , *RIEMANN surfaces - Abstract
In 1895 Wiman introduced the Riemann surface 𝒲 of genus 6 over the complex field ℂ defined by the equation X6+Y6+ℨ6+(X2+Y2+ℨ2)(X4+Y4+ℨ4)−12X2Y2ℨ2 = 0, and showed that its full automorphism group is isomorphic to the symmetric group S5. We show that this holds also over every algebraically closed field 𝕂 of characteristic p ≥ 7. For p = 2, 3 the above polynomial is reducible over 𝕂, and for p = 5 the curve 𝒲 is rational and Aut(𝒲) ≅ PGL(2,𝕂). We also show that Wiman's 𝔽192-maximal sextic 𝒲 is not Galois covered by the Hermitian curve H19 over the finite field 𝔽192. [ABSTRACT FROM AUTHOR]
- Published
- 2021
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