Add to ORKGAbstract. We investigate finite linear spaces consisting of two sym-metric configurations. A construction method using projective planes is presented, giving a possibly infinite number of examples. Other examples are constructed by difference families and authomorphism groups, includ-ing a complete classification of the smallest case. A question whether any Steiner 2-design with twice as many lines as points belongs to this family of linear spaces is raised, and answered in the affirmative for all known examples of such designs. 1
AbstractIt is shown that every non-degenerate linear space withn2 + n + 2lines,n ≥ 6, hasv ⩽ n2 + 1 ...
We classified all finite linear spaces having property: for every pair L, L' of intersecting lines, ...
A finite linear space is a finite set of points and lines, where any two points lie on a unique line...
We investigate finite linear spaces consisting of two symmetric configurations. A construction metho...
We investigate finite linear spaces consisting of two symmetric configurations. A construction metho...
Projective and affine planes are, besides the degenerate projective planes, the only known examples ...
AbstractThis article is a contribution to the study of linear spaces admitting a line-transitive aut...
Linear spaces belong to the most fundamental geometric and combinatorial structures. In this paper I...
Linear spaces belong to the most fundamental geometric and combinatorial structures. In this paper I...
Linear spaces belong to the most fundamental geometric and combinatorial structures. In this paper I...
Linear spaces belong to the most fundamental geometric and combinatorial structures. In this paper I...
Linear spaces belong to the most fundamental geometric and combinatorial structures. In this paper I...
In combinatorial mathematics, a Steiner system is a type of block design. Specifically, a Steiner sy...
Projective and affine planes are, besides the degenerate projective planes, the only known examples ...
AbstractIn this paper some of the work in linear spaces in which most of the lines have few points i...
AbstractIt is shown that every non-degenerate linear space withn2 + n + 2lines,n ≥ 6, hasv ⩽ n2 + 1 ...
We classified all finite linear spaces having property: for every pair L, L' of intersecting lines, ...
A finite linear space is a finite set of points and lines, where any two points lie on a unique line...
We investigate finite linear spaces consisting of two symmetric configurations. A construction metho...
We investigate finite linear spaces consisting of two symmetric configurations. A construction metho...
Projective and affine planes are, besides the degenerate projective planes, the only known examples ...
AbstractThis article is a contribution to the study of linear spaces admitting a line-transitive aut...
Linear spaces belong to the most fundamental geometric and combinatorial structures. In this paper I...
Linear spaces belong to the most fundamental geometric and combinatorial structures. In this paper I...
Linear spaces belong to the most fundamental geometric and combinatorial structures. In this paper I...
Linear spaces belong to the most fundamental geometric and combinatorial structures. In this paper I...
Linear spaces belong to the most fundamental geometric and combinatorial structures. In this paper I...
In combinatorial mathematics, a Steiner system is a type of block design. Specifically, a Steiner sy...
Projective and affine planes are, besides the degenerate projective planes, the only known examples ...
AbstractIn this paper some of the work in linear spaces in which most of the lines have few points i...
AbstractIt is shown that every non-degenerate linear space withn2 + n + 2lines,n ≥ 6, hasv ⩽ n2 + 1 ...
We classified all finite linear spaces having property: for every pair L, L' of intersecting lines, ...
A finite linear space is a finite set of points and lines, where any two points lie on a unique line...