Add to ORKGThe face lattice of hyperplane arrangements. - In: Discrete mathematics. 73. 1988/89. S. 233-238
We extend the facial weak order from finite Coxeter groups to central hyperplane arrangements. The f...
AbstractWe give an algorithm that constructs the Hasse diagram of the face lattice of a convex polyt...
AbstractEvery arrangement H of affine hyperplanes in Rd determines a partition of Rd into open topol...
The face lattice of hyperplane arrangements. - In: Discrete mathematics. 73. 1988/89. S. 233-238
The face lattice of hyperplane arrangements. - In: Discrete mathematics. 73. 1988/89. S. 233-238
Hyperplane arrangements with a lattice of regions / Anders Björner, Paul H. Edelman, and Günter M. Z...
Hyperplane arrangements with a lattice of regions / Anders Björner, Paul H. Edelman, and Günter M. Z...
Hyperplane arrangements with a lattice of regions / Anders Björner, Paul H. Edelman, and Günter M. Z...
AbstractEvery arrangement H of affine hyperplanes in Rd determines a partition of Rd into open topol...
Let ${\cal A}$ be a hyperplane arrangement and let F and G be two of its faces. We define the produc...
Let ${\cal A}$ be a hyperplane arrangement and let F and G be two of its faces. We define the produc...
International audienceWe introduce the facial weak order of a real hyperplane arrangement A. It is a...
International audienceWe introduce the facial weak order of a real hyperplane arrangement A. It is a...
34 pages, 12 figuresInternational audienceWe extend the facial weak order from finite Coxeter groups...
34 pages, 12 figuresInternational audienceWe extend the facial weak order from finite Coxeter groups...
We extend the facial weak order from finite Coxeter groups to central hyperplane arrangements. The f...
AbstractWe give an algorithm that constructs the Hasse diagram of the face lattice of a convex polyt...
AbstractEvery arrangement H of affine hyperplanes in Rd determines a partition of Rd into open topol...
The face lattice of hyperplane arrangements. - In: Discrete mathematics. 73. 1988/89. S. 233-238
The face lattice of hyperplane arrangements. - In: Discrete mathematics. 73. 1988/89. S. 233-238
Hyperplane arrangements with a lattice of regions / Anders Björner, Paul H. Edelman, and Günter M. Z...
Hyperplane arrangements with a lattice of regions / Anders Björner, Paul H. Edelman, and Günter M. Z...
Hyperplane arrangements with a lattice of regions / Anders Björner, Paul H. Edelman, and Günter M. Z...
AbstractEvery arrangement H of affine hyperplanes in Rd determines a partition of Rd into open topol...
Let ${\cal A}$ be a hyperplane arrangement and let F and G be two of its faces. We define the produc...
Let ${\cal A}$ be a hyperplane arrangement and let F and G be two of its faces. We define the produc...
International audienceWe introduce the facial weak order of a real hyperplane arrangement A. It is a...
International audienceWe introduce the facial weak order of a real hyperplane arrangement A. It is a...
34 pages, 12 figuresInternational audienceWe extend the facial weak order from finite Coxeter groups...
34 pages, 12 figuresInternational audienceWe extend the facial weak order from finite Coxeter groups...
We extend the facial weak order from finite Coxeter groups to central hyperplane arrangements. The f...
AbstractWe give an algorithm that constructs the Hasse diagram of the face lattice of a convex polyt...
AbstractEvery arrangement H of affine hyperplanes in Rd determines a partition of Rd into open topol...