Add to ORKGWe define generalized Clifford parallelisms in PG(3, F) with the help of a quaternion skew field H over a field F of arbitrary characteristic. Moreover we give a geometric description of such parallelisms involving hyperbolic quadrics in projective spaces over suitable quadratic extensions of F
Johnson showed that the only doubly transitive parallelisms of PG(3, q) are exactly the two regula...
AbstractWith any flock F of the quadratic cone K of PG(3, q) there corresponds a generalized quadran...
AbstractNew constructions of parallelisms in PG(3,q) are given with the concept of coset switching o...
We define generalized Clifford parallelisms in PG(3,F) with the help of a quaternion skew field H o...
Given two parallelisms of a projective space we describe a construction, called blending, that yield...
In this paper we focus on the description of the automorphism group Γ of a Clifford-like parallelism...
We recall the notions of Clifford and Clifford-like parallelisms in a 3-dimensional projective doubl...
A hyperbolic fibration is set of q \Gamma 1 hyperbolic quadrics and two lines which together partiti...
Betten and Riesinger constructed Parallelisms of $\mathop{\rm PG}(3,\mathbb R)$ with automorphism gr...
AbstractWe determine, by a computer search, all the cyclic parallelisms of PG(3,5). There are 45 of ...
This paper presents a thoughful review of: (a) the Clifford algebra (Formula presented.) of multivec...
In 1873, W. K. Clifford introduced a notion of parallelism in the three-dimensional elliptic space t...
A garden of parallelisms in $PG(3,R)$ are constructed,where $R$ is the field of real numbers
Using the Klein correspondence, regular parallelisms of PG(3,R) have been described by Betten and Ri...
Abstract. In this paper we combine methods from projective geome-try, Klein’s model, and Clifford al...
Johnson showed that the only doubly transitive parallelisms of PG(3, q) are exactly the two regula...
AbstractWith any flock F of the quadratic cone K of PG(3, q) there corresponds a generalized quadran...
AbstractNew constructions of parallelisms in PG(3,q) are given with the concept of coset switching o...
We define generalized Clifford parallelisms in PG(3,F) with the help of a quaternion skew field H o...
Given two parallelisms of a projective space we describe a construction, called blending, that yield...
In this paper we focus on the description of the automorphism group Γ of a Clifford-like parallelism...
We recall the notions of Clifford and Clifford-like parallelisms in a 3-dimensional projective doubl...
A hyperbolic fibration is set of q \Gamma 1 hyperbolic quadrics and two lines which together partiti...
Betten and Riesinger constructed Parallelisms of $\mathop{\rm PG}(3,\mathbb R)$ with automorphism gr...
AbstractWe determine, by a computer search, all the cyclic parallelisms of PG(3,5). There are 45 of ...
This paper presents a thoughful review of: (a) the Clifford algebra (Formula presented.) of multivec...
In 1873, W. K. Clifford introduced a notion of parallelism in the three-dimensional elliptic space t...
A garden of parallelisms in $PG(3,R)$ are constructed,where $R$ is the field of real numbers
Using the Klein correspondence, regular parallelisms of PG(3,R) have been described by Betten and Ri...
Abstract. In this paper we combine methods from projective geome-try, Klein’s model, and Clifford al...
Johnson showed that the only doubly transitive parallelisms of PG(3, q) are exactly the two regula...
AbstractWith any flock F of the quadratic cone K of PG(3, q) there corresponds a generalized quadran...
AbstractNew constructions of parallelisms in PG(3,q) are given with the concept of coset switching o...