Intersection of irreducible curves and the Hermitian curve
Abstract
Let Hq denote the Hermitian curve in P2 over Fq2 and Cd be an irreducible plane projective curve in P2 also defined over Fq2 of degree d. Can Hq and Cd intersect in exactly d(q+1) distinct Fq2-rational points? B\'ezout's theorem immediately implies that Hq and Cd intersect in at most d(q+1) points, but equality is not guaranteed over Fq2. In this paper we prove that for many d q2-q+1, the answer to this question is affirmative. The case d=1 is trivial: it is well known that any secant line of Hq defined over Fq2 intersects Hq in q+1 rational points. Moreover, all possible intersections of conics and Hq were classified by Donati et al. in 2009 and their results imply that the answer to the question above is affirmative for d=2 and q 4, as well. However, an exhaustive computer search quickly reveals that for (q,d) ∈ \(2,2),(3,2),(2,3)\, the answer is instead negative. We show that for q d q2-q+1, d=(q+1)/2 and d=3, q ≥ 3 the answer is again affirmative. Various partial results for the case d small compared to q are also provided.
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