Hermitian Veronesean Caps

“…Thas & Van Maldeghem [18] generalized this to the class of ovoids of finite 3-space, whereas Schillewaert & Van Maldeghem [12] proved the same characterization for Hermitian Veronese varieties over any field, as C-Veronesean sets, where C is the class of all ovoids of PG(3, K), with K any skew field.…”

“…Our claim is proved. Now, again by the second main result of [13], G is isomorphic to the quadric Veronese variety of the projective plane PG(3, K). Adding t, we see that N = 6.…”

“…Let us start by briefly recalling the "classical" Mazzocca-Melone axioms, in their simplest form, namely, for the quadric Veronesean variety X of a projective plane PG(2, K) in the 5-dimensional projective space PG(5, K) (see [13]). One hypothesizes a family Π of planes each member of which intersects X in a conic (or, more generally, an oval, see below).…”

“…This was later generalized by Hirschfeld & Thas to include all finite fields [7]. Thas & Van Maldeghem [16] then considered the case where C is the class of finite plane ovals (and proved each of these ovals must automatically be a conic; an oval is a set of points of a projective plane no three on a line and through each of its point a unique line intersecting the oval in one point), whereas Schillewaert & Van Maldeghem [13] classified C-Veronesean sets for C the class of all ovals of any (finite or infinite) projective plane.…”

“…Consequently, we see that P spans a 5-space, and so it defines a Veronesean embedding of PG(2, K). By [13], P defines a quadric Veronese variety V.…”

Projective planes over 2-dimensional quadratic algebras

“…Thas & Van Maldeghem [18] generalized this to the class of ovoids of finite 3-space, whereas Schillewaert & Van Maldeghem [12] proved the same characterization for Hermitian Veronese varieties over any field, as C-Veronesean sets, where C is the class of all ovoids of PG(3, K), with K any skew field.…”

“…Our claim is proved. Now, again by the second main result of [13], G is isomorphic to the quadric Veronese variety of the projective plane PG(3, K). Adding t, we see that N = 6.…”

“…Let us start by briefly recalling the "classical" Mazzocca-Melone axioms, in their simplest form, namely, for the quadric Veronesean variety X of a projective plane PG(2, K) in the 5-dimensional projective space PG(5, K) (see [13]). One hypothesizes a family Π of planes each member of which intersects X in a conic (or, more generally, an oval, see below).…”

“…This was later generalized by Hirschfeld & Thas to include all finite fields [7]. Thas & Van Maldeghem [16] then considered the case where C is the class of finite plane ovals (and proved each of these ovals must automatically be a conic; an oval is a set of points of a projective plane no three on a line and through each of its point a unique line intersecting the oval in one point), whereas Schillewaert & Van Maldeghem [13] classified C-Veronesean sets for C the class of all ovals of any (finite or infinite) projective plane.…”

“…Consequently, we see that P spans a 5-space, and so it defines a Veronesean embedding of PG(2, K). By [13], P defines a quadric Veronese variety V.…”

Projective planes over 2-dimensional quadratic algebras

Generalized Veronesean embeddings of projective spaces

A characterization of d-uple Veronese varieties