On a class of quasi-Hermitian surfaces in even characteristic

Abstract

In [1], a new quasi-Hermitian variety Hr in PG(r, q2), with q = 2e and e ≥ 3 an odd integer, was constructed. The variety depends on a primitive element of the underlying field GF(q2).11 In the present paper, we first provide a classification of such varieties up to projective equivalence in finite projective spaces of arbitrary dimension. Then, we focus on the case r = 3 and study the structure of the lines contained in H3; as a consequence, we determine the full automorphism group of H3 . Finally, as a byproduct, we prove the equivalence of certain minimal codes introduced in [3].