Intersection of two quadrics with no common hyperplane in $\mathbb{P}^{n}(\mathbb{F}_q)$}}

Chaoping Xing

Intersection of two quadrics with no common hyperplane in Pn(Fq)

Abstract

Let Q1 and Q2 be two arbitrary quadrics with no common hyperplane in Pn(Fq). We give the best upper bound for the number of points in the intersection of these two quadrics. Our result states that | Q1 Q2| 4qn-2+πn-3. This result inspires us to establish the conjecture on the number of points of an algebraic set X⊂ Pn(Fq) of dimension s and degree d: |X(Fq)| dqs+πs-1.

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