Abstract. Sweeping is an important algorithmic tool in geometry. In the rst part of this paper we dene sweeps of arrangements and use the `Sweeping Lemma ' to show that Euclidean arrangements of pseudolines can be represented by wiring diagrams and zonotopal tilings. In the second part we introduce a new representation for Euclidean arrangements of pseudolines. This representation records an `orientation ' for each triple of lines. It turns out that a `triple orientation ' corresponds to an arrangement exactly if it obeys a generalized transitivity law. Moreover, the `triple orientations ' carry a natural order relation which induces an order relation on arrangements. A closer look on the combinatorics behind this leads ...
An arrangement of pseudocircles is a finite collection of Jordan curves in the plane with the additi...
The arrangement of a finite collection of geometric objects is the decomposition of the space into c...
E mail ffelsnerkriegelginffuberlinde Abstract The number of triangles in arrangements of lines and ...
AbstractSweeping is an important algorithmic tool in geometry. In the first part of this paper we de...
It is well known that not every combinatorial configuration admits a geo-metric realization with poi...
Abstract The higher Bruhat orders B(n, k) are combinatorially defined partial orders (and hence grap...
AbstractThe higher Bruhat orders B(n,k) are combinatorially defined partial orders (and hence graphs...
AbstractSweeping a collection of figures in the Euclidean plane with a straight line is one of the n...
We consider arrangements of n pseudo-lines in the Euclidean plane where each pseudo-line ℓi is repre...
International audienceWe study the set of all pseudoline arrangements with contact points which cove...
AbstractPseudoline diagrams are simple arrangements of pseudolines in the affine plane where at each...
This paper begins by extending the notion of a combinatorial configuration of points and lines to a ...
Arrangement of lines is the subdivision of a plane by a finite set of lines. Arrangement is an impor...
A complex line arrangement is a collection of complex projective lines in \(CP^2\) which may interse...
Arrangements of lines and pseudolines are important and appealing objects for research in discrete a...
An arrangement of pseudocircles is a finite collection of Jordan curves in the plane with the additi...
The arrangement of a finite collection of geometric objects is the decomposition of the space into c...
E mail ffelsnerkriegelginffuberlinde Abstract The number of triangles in arrangements of lines and ...
AbstractSweeping is an important algorithmic tool in geometry. In the first part of this paper we de...
It is well known that not every combinatorial configuration admits a geo-metric realization with poi...
Abstract The higher Bruhat orders B(n, k) are combinatorially defined partial orders (and hence grap...
AbstractThe higher Bruhat orders B(n,k) are combinatorially defined partial orders (and hence graphs...
AbstractSweeping a collection of figures in the Euclidean plane with a straight line is one of the n...
We consider arrangements of n pseudo-lines in the Euclidean plane where each pseudo-line ℓi is repre...
International audienceWe study the set of all pseudoline arrangements with contact points which cove...
AbstractPseudoline diagrams are simple arrangements of pseudolines in the affine plane where at each...
This paper begins by extending the notion of a combinatorial configuration of points and lines to a ...
Arrangement of lines is the subdivision of a plane by a finite set of lines. Arrangement is an impor...
A complex line arrangement is a collection of complex projective lines in \(CP^2\) which may interse...
Arrangements of lines and pseudolines are important and appealing objects for research in discrete a...
An arrangement of pseudocircles is a finite collection of Jordan curves in the plane with the additi...
The arrangement of a finite collection of geometric objects is the decomposition of the space into c...
E mail ffelsnerkriegelginffuberlinde Abstract The number of triangles in arrangements of lines and ...