Unitals which meet Baer subplanes in 1 modulo q points

Abstract

We prove that a parabolic unital U in a translation plane π of order q2 with kernel containing GF(q) is a Buekenhout-Metz unital if and only if certain Baer subplanes containing the translation line of π meet U in 1 modulo q points. As a corollary we show that a unital U in PG(2, g2) is classical if and only if it meets each Baer subplane of PG(2,q2) in 1 modulo q points. © Birkhäuser Verlag, 2000.