We consider two families of point sets in (not necessarily finite) projective planes, one of which consists of the Hermitian curves, and give a common characterization of the point sets in both families. One of the properties we use to characterize them will be the existence of a certain configuration of Baer sublines
Every nontrivial linear space embedded in a Pappian projective space such that the blocks of the lin...
A unital, that is, a block-design 2 - (q^3 + 1, q + 1,1), is embedded in a projective plane II of or...
AbstractWe provide short proofs that suitable unitals in derivable projective planes give rise to un...
We consider two families of point sets in (not necessarily finite) projective planes, one of which c...
AbstractWe define a cotangency set (in the projective plane over any field) to be a set of points th...
AbstractThere have been many characterizations of the classical curves in PG(2, q) given by the zero...
We identify the points of PG(2, q) ith the directions of lines in GF(q 3), viewed as a 3-dimensional...
The original publication can be found at www.springerlink.comThis article proves a characterisation ...
It is known that the Hermitian varieties are codewords in the code defined by the points and hyperpl...
AbstractUsing a Hermitian form on a vector space over GF (l), we produce a geometry on the associate...
AbstractThree types of subsets of PG(2,q2) of type (0,1,2,q+1) are defined, namely CF-sets, K-sets a...
AbstractIn PG(2,q2) let ℓ∞ denote a fixed line, then the Baer subplanes which intersect ℓ∞ in q+1 po...
Available online 16 March 2002In PG(2,q2) let ℓ∞ denote a fixed line, then the Baer subplanes which ...
AbstractKestenband [Unital intersections in finite projective planes, Geom. Dedicata 11(1) (1981) 10...
A combinatorial characterization of a non{singular Hermitian variety of the fnite 3-dimensional pro...
Every nontrivial linear space embedded in a Pappian projective space such that the blocks of the lin...
A unital, that is, a block-design 2 - (q^3 + 1, q + 1,1), is embedded in a projective plane II of or...
AbstractWe provide short proofs that suitable unitals in derivable projective planes give rise to un...
We consider two families of point sets in (not necessarily finite) projective planes, one of which c...
AbstractWe define a cotangency set (in the projective plane over any field) to be a set of points th...
AbstractThere have been many characterizations of the classical curves in PG(2, q) given by the zero...
We identify the points of PG(2, q) ith the directions of lines in GF(q 3), viewed as a 3-dimensional...
The original publication can be found at www.springerlink.comThis article proves a characterisation ...
It is known that the Hermitian varieties are codewords in the code defined by the points and hyperpl...
AbstractUsing a Hermitian form on a vector space over GF (l), we produce a geometry on the associate...
AbstractThree types of subsets of PG(2,q2) of type (0,1,2,q+1) are defined, namely CF-sets, K-sets a...
AbstractIn PG(2,q2) let ℓ∞ denote a fixed line, then the Baer subplanes which intersect ℓ∞ in q+1 po...
Available online 16 March 2002In PG(2,q2) let ℓ∞ denote a fixed line, then the Baer subplanes which ...
AbstractKestenband [Unital intersections in finite projective planes, Geom. Dedicata 11(1) (1981) 10...
A combinatorial characterization of a non{singular Hermitian variety of the fnite 3-dimensional pro...
Every nontrivial linear space embedded in a Pappian projective space such that the blocks of the lin...
A unital, that is, a block-design 2 - (q^3 + 1, q + 1,1), is embedded in a projective plane II of or...
AbstractWe provide short proofs that suitable unitals in derivable projective planes give rise to un...
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