For each prime power ℓ the plane curve Xℓwith equation Yℓ2ℓ+1=Xℓ2-X is maximal over Fℓ6. Garcia and Stichtenoth in 2006 proved that X3is not Galois covered by the Hermitian curve and raised the same question for Xℓwith ℓ>3; in this paper we show that Xℓis not Galois covered by the Hermitian curve for any ℓ>3. Analogously, Duursma and Mak proved that the generalized GK curve Cℓnover Fℓ2nis not a quotient of the Hermitian curve for ℓ>2 and n≥5, leaving the case ℓ=2 open; here we show that C2nis not Galois covered by the Hermitian curve over F22nfor n≥5.
On maximal curves that are not quotients of the Hermitian curve
Zini G.
2016
Abstract
For each prime power ℓ the plane curve Xℓwith equation Yℓ2ℓ+1=Xℓ2-X is maximal over Fℓ6. Garcia and Stichtenoth in 2006 proved that X3is not Galois covered by the Hermitian curve and raised the same question for Xℓwith ℓ>3; in this paper we show that Xℓis not Galois covered by the Hermitian curve for any ℓ>3. Analogously, Duursma and Mak proved that the generalized GK curve Cℓnover Fℓ2nis not a quotient of the Hermitian curve for ℓ>2 and n≥5, leaving the case ℓ=2 open; here we show that C2nis not Galois covered by the Hermitian curve over F22nfor n≥5.File in questo prodotto:
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