Add to ORKGDedicated to Adriano Barlotti on the occasion of his 80th birthday Abstract. The projective full embeddings of partial geometries are known. So are the projective full embeddings of semipartial and dual semipartial geometries in case of a> 1. If a 1, a semipartial geometry is known as a partial quadrangle. No projective full embedding of a proper partial quadrangle is known. However besides a unique example for q 2, there is one example known of a dual partial quadrangle fully embedded in a PGð3; qÞ, any q. In this paper we will prove that if the dual of a proper partial quadrangle S is fully embedded in PGð3; qÞ, then m c q. If equality holds, then S is uniquely defined. q tþ1
In this paper we characterize the partial geometry T2* (K) embedded in AG(3, q) as a net-inducible p...
AbstractIn this paper, we first prove some general results on the number of fixed points of collinea...
AbstractThe Handbook of Incidence Geometry (Handbook of Incidence Geometry, Buildings and Foundation...
Dedicated to Adriano Barlotti on the occasion of his 80th birthday Abstract The prqjective full embe...
AbstractThe incidence structures known as (α,β)-geometries are a generalization of partial geometrie...
AbstractThe incidence structures known as (α,β)-geometries are a generalization of partial geometrie...
The incidence structures known as (alpha, beta)-geometries are a generalization of partial geometrie...
AbstractIn European J. Combin. 8 (1987) 121 a characterization, based on parallelism, of the partial...
AbstractIn European J. Combin. 8 (1987) 121 a characterization, based on parallelism, of the partial...
Abstract. The Grassmannian, half spinor and dual orthogonal geometries all have embed-dings in proje...
AbstractIn [11] P. J. Cameron introduced partial quadrangles and raised the question of finding a ch...
AbstractDebroey and Thas introduced semipartial geometries and determined the full embeddings of sem...
AbstractDebroey and Thas introduced semipartial geometries and determined the full embeddings of sem...
In this paper we characterize the partial geometry T2* (K) embedded in AG(3, q) as a net-inducible p...
AbstractIn Part I we obtained results about the embedding of (0, α)-geometries in PG(3, q). Here we ...
In this paper we characterize the partial geometry T2* (K) embedded in AG(3, q) as a net-inducible p...
AbstractIn this paper, we first prove some general results on the number of fixed points of collinea...
AbstractThe Handbook of Incidence Geometry (Handbook of Incidence Geometry, Buildings and Foundation...
Dedicated to Adriano Barlotti on the occasion of his 80th birthday Abstract The prqjective full embe...
AbstractThe incidence structures known as (α,β)-geometries are a generalization of partial geometrie...
AbstractThe incidence structures known as (α,β)-geometries are a generalization of partial geometrie...
The incidence structures known as (alpha, beta)-geometries are a generalization of partial geometrie...
AbstractIn European J. Combin. 8 (1987) 121 a characterization, based on parallelism, of the partial...
AbstractIn European J. Combin. 8 (1987) 121 a characterization, based on parallelism, of the partial...
Abstract. The Grassmannian, half spinor and dual orthogonal geometries all have embed-dings in proje...
AbstractIn [11] P. J. Cameron introduced partial quadrangles and raised the question of finding a ch...
AbstractDebroey and Thas introduced semipartial geometries and determined the full embeddings of sem...
AbstractDebroey and Thas introduced semipartial geometries and determined the full embeddings of sem...
In this paper we characterize the partial geometry T2* (K) embedded in AG(3, q) as a net-inducible p...
AbstractIn Part I we obtained results about the embedding of (0, α)-geometries in PG(3, q). Here we ...
In this paper we characterize the partial geometry T2* (K) embedded in AG(3, q) as a net-inducible p...
AbstractIn this paper, we first prove some general results on the number of fixed points of collinea...
AbstractThe Handbook of Incidence Geometry (Handbook of Incidence Geometry, Buildings and Foundation...