Let u be a unital in PG(2, q(2)), q = p(h) and let G be the group of projectivities of PG(2, q(2)) stabilizing u. In this paper we prove that u is a Buekenhout-Metz unital containing conics and q is odd if, and only if, there exists a point A of u such that the stabilizer of A in G contains an elementary Abelian p-group of order q(2) with no non-identity elations.

• 出版日期2012-8-6