Curves on Frobenius nonclassical loci of hypersurfaces

Abstract

Let S ⊂ Pn be an absolutely irreducible projective hypersurface defined over a finite field Fq, equipped with the Fq-Frobenius map q. In this paper, we investigate irreducible curves X ⊂ S_q, where S_q is the Fq-Frobenius nonclassical locus of S. In particular, we show that every curve X ⊂ S_q such that the restriction of the Gauss map of S to X is inseparable is Fq-Frobenius nonclassical. This provides a way to construct new Frobenius nonclassical curves, which are curves that tend to have many Fq-rational points. We also prove that a certain type of Frobenius nonclassical hypersurfaces S defined by separated variables are such that their Gauss maps restricted to any curve contained in S is inseparable. Finally, in parallel with the plane curve cases, we show that if the strict Gauss map of a Fq-Frobenius nonclassical hypersurface S is given by p powers, then is purely inseparable.

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