Curves on Frobenius classical surfaces in P3 over finite fields
Abstract
In this paper we give an upper bound on the number of rational points on an irreducible curve C of degree δ defined over a finite field Fq lying on a Frobenius classical surface S embedded in P3. This leads us to investigate arithmetic properties of curves lying on surfaces. In a certain range of δ and q, our result improves all other known bounds in the context of space curves.
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