A bound for the number of points of space curves over finite fields

Abstract

For a non-degenerate irreducible curve C of degree d in P3 over Fq, we prove that the number Nq(C) of Fq-rational points of C satisfies the inequality Nq(C) ≤ (d-2)q+1. Our result improves the previous bound Nq(C) ≤ (d-1)q+1 obtained by Homma in 2012 and leads to a natural conjecture generalizing Sziklai's bound for the number of points of plane curves over finite fields.