Classification of sextic curves in the Fano 3-fold V5 with rational Galois covers in P3

Abstract

In this paper, we classify sextic curves in the Fano 3-fold V5 (the smooth quintic del Pezzo 3-fold) that admit rational Galois covers in the complex P3. We show that the moduli space of such sextic curves is of complex dimension 2 through the invariants of the engaged Galois groups for the explicit constructions. This raises the intriguing question of understanding the moduli space of sextic curves in V5 through their Galois covers in P3.

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