Given the toric (or toral) arrangement defined by a root system \u3a6, we describe the poset of its layers (connected components of intersections) and we count its elements. Indeed we show how to reduce to zero-dimensional layers, and in this case we provide an explicit formula involving the maximal subdiagrams of the affine Dynkin diagram of \u3a6. Then we compute the Euler characteristic and the Poincare' polynomial of the complement of the arrangement, which is the set of regular points of the torus
In this paper we build an Orlik–Solomon model for the canonical gradation of the cohomology algebra ...
In this paper we build an Orlik\u2013Solomon model for the canonical gradation of the cohomology alg...
Motivated by the counting formulas of integral polytopes, as in Brion and Vergne [5], [4], and Szene...
Given the toric (or toral) arrangement defined by a root system \u3a6, we describe the poset of its ...
Given the toric (or toral) arrangement defined by a root system \u3a6, we describe the poset of its ...
A toric arrangement is a finite set of hypersurfaces in a complex torus, each hypersurface being the...
In the first part of this thesis we deal with the theory of hyperplane arrangements, that are (finit...
A toric arrangement is a finite set of hypersurfaces in a complex torus, every hypersurface being th...
A toric arrangement is a finite set of hypersurfaces in a complex torus, every hypersurface being th...
AbstractA toric arrangement is a finite set of hypersurfaces in a complex torus, every hypersurface ...
A toric arrangement is a finite set of hypersurfaces in a complex torus, every hypersurface being th...
A toric arrangement is a finite set of hypersurfaces in a complex torus, every hypersurface being th...
A toric arrangement is a finite collection of codimension-1 subtori in a torus. The intersections of...
AbstractA toric arrangement is a finite set of hypersurfaces in a complex torus, every hypersurface ...
In this paper we build an Orlik–Solomon model for the canonical gradation of the cohomology algebra ...
In this paper we build an Orlik–Solomon model for the canonical gradation of the cohomology algebra ...
In this paper we build an Orlik\u2013Solomon model for the canonical gradation of the cohomology alg...
Motivated by the counting formulas of integral polytopes, as in Brion and Vergne [5], [4], and Szene...
Given the toric (or toral) arrangement defined by a root system \u3a6, we describe the poset of its ...
Given the toric (or toral) arrangement defined by a root system \u3a6, we describe the poset of its ...
A toric arrangement is a finite set of hypersurfaces in a complex torus, each hypersurface being the...
In the first part of this thesis we deal with the theory of hyperplane arrangements, that are (finit...
A toric arrangement is a finite set of hypersurfaces in a complex torus, every hypersurface being th...
A toric arrangement is a finite set of hypersurfaces in a complex torus, every hypersurface being th...
AbstractA toric arrangement is a finite set of hypersurfaces in a complex torus, every hypersurface ...
A toric arrangement is a finite set of hypersurfaces in a complex torus, every hypersurface being th...
A toric arrangement is a finite set of hypersurfaces in a complex torus, every hypersurface being th...
A toric arrangement is a finite collection of codimension-1 subtori in a torus. The intersections of...
AbstractA toric arrangement is a finite set of hypersurfaces in a complex torus, every hypersurface ...
In this paper we build an Orlik–Solomon model for the canonical gradation of the cohomology algebra ...
In this paper we build an Orlik–Solomon model for the canonical gradation of the cohomology algebra ...
In this paper we build an Orlik\u2013Solomon model for the canonical gradation of the cohomology alg...
Motivated by the counting formulas of integral polytopes, as in Brion and Vergne [5], [4], and Szene...
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