Ovoids in the cyclic presentation of PG(3,q)

Abstract

We consider the cyclic presentation of PG(3,q) whose points are in the finite field Fq4 and describe the known ovoids therein. We revisit the set O, consisting of (q2+1)-th roots of unity in Fq4, and prove that it forms an elliptic quadric within the cyclic presentation of PG(3,q). Additionally, following the work of Glauberman on Suzuki groups, we offer a new description of Suzuki-Tits ovoids in the cyclic presentation of PG(3,q), characterizing them as the zeroes of a polynomial over Fq4.

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