Add to ORKGWe give some new advances in the research of the maximum number of triangles that we may obtain in a simple arrangements of n lines or pseudo-lines
We demonstrate an infinite family of pseudoline arrangements, in which an arrangement of n pseudo-li...
We study the maximum numbers of pseudo-triangulations and pointed pseudo-triangulations that can be ...
AbstractA set of n nonconcurrent lines in the projective plane (called an arrangment) divides the pl...
It is well-known and easy to observe that affine (respectively projective) simple arrangement of n p...
Abstract. The number of triangles in arrangements of lines and pseudolines has been object of some r...
E mail ffelsnerkriegelginffuberlinde Abstract The number of triangles in arrangements of lines and ...
AbstractGrünbaum has conjectured that any arrangement ofnpseudolines in the real projective plane ha...
Arrangements of lines and pseudolines are important and appealing objects for research in discrete a...
Abstract. Let A be an arrangement of n pseudolines in the real projective plane and let p3(A) be the...
AbstractGiven a set of n points in general position in the plane, where n is even, a halving line is...
It is shown that if a simple Euclidean arrangement of n pseudolines has no (>= 5)-gons, then it has ...
AbstractWe disprove a conjecture of B. Grünbaum by constructing an arrangement A12 of 12 (straight) ...
A pseudocircle is a simple closed curve on the sphere or in the plane. The study of arrangements of ...
Arrangements of lines and pseudolines are fundamental objects in discrete and computational geometry...
We consider arrangements of n pseudo-lines in the Euclidean plane where each pseudo-line ℓi is repre...
We demonstrate an infinite family of pseudoline arrangements, in which an arrangement of n pseudo-li...
We study the maximum numbers of pseudo-triangulations and pointed pseudo-triangulations that can be ...
AbstractA set of n nonconcurrent lines in the projective plane (called an arrangment) divides the pl...
It is well-known and easy to observe that affine (respectively projective) simple arrangement of n p...
Abstract. The number of triangles in arrangements of lines and pseudolines has been object of some r...
E mail ffelsnerkriegelginffuberlinde Abstract The number of triangles in arrangements of lines and ...
AbstractGrünbaum has conjectured that any arrangement ofnpseudolines in the real projective plane ha...
Arrangements of lines and pseudolines are important and appealing objects for research in discrete a...
Abstract. Let A be an arrangement of n pseudolines in the real projective plane and let p3(A) be the...
AbstractGiven a set of n points in general position in the plane, where n is even, a halving line is...
It is shown that if a simple Euclidean arrangement of n pseudolines has no (>= 5)-gons, then it has ...
AbstractWe disprove a conjecture of B. Grünbaum by constructing an arrangement A12 of 12 (straight) ...
A pseudocircle is a simple closed curve on the sphere or in the plane. The study of arrangements of ...
Arrangements of lines and pseudolines are fundamental objects in discrete and computational geometry...
We consider arrangements of n pseudo-lines in the Euclidean plane where each pseudo-line ℓi is repre...
We demonstrate an infinite family of pseudoline arrangements, in which an arrangement of n pseudo-li...
We study the maximum numbers of pseudo-triangulations and pointed pseudo-triangulations that can be ...
AbstractA set of n nonconcurrent lines in the projective plane (called an arrangment) divides the pl...