We show that the rational homotopy type of the complement of a toric arrangement is completely determined by two sets of discrete data. This is obtained by introducing a differential graded algebra over Q whose minimal model is equivalent to the Sullivan minimal model of A
Let M be a simply connected closed manifold of dimension n. We study the rational homotopy type of t...
The investigation of the structure of the rational model of Sullivan on algebra of smooth differenti...
A toric arrangement is a finite set of hypersurfaces in a complex torus, every hypersurface being th...
We show that the rational homotopy type of the complement of a toric arrangement is completely deter...
We show that the rational homotopy type of the complement of a toric arrangement is completely deter...
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 ...
Let M be a simply connected closed manifold and consider the (ordered) configuration space F(M, k) o...
In this paper we build an Orlik\u2013Solomon model for the canonical gradation of the cohomology alg...
For a simplicial complex K, the de Rham algebra E*(K) is the differential graded algebra (DGA) of Q-...
To any graph and smooth algebraic curve C, one may associate a “hypercurve” arrangement, and one can...
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, each hypersurface being the...
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...
Let M be a simply connected closed manifold of dimension n. We study the rational homotopy type of t...
The investigation of the structure of the rational model of Sullivan on algebra of smooth differenti...
A toric arrangement is a finite set of hypersurfaces in a complex torus, every hypersurface being th...
We show that the rational homotopy type of the complement of a toric arrangement is completely deter...
We show that the rational homotopy type of the complement of a toric arrangement is completely deter...
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 ...
Let M be a simply connected closed manifold and consider the (ordered) configuration space F(M, k) o...
In this paper we build an Orlik\u2013Solomon model for the canonical gradation of the cohomology alg...
For a simplicial complex K, the de Rham algebra E*(K) is the differential graded algebra (DGA) of Q-...
To any graph and smooth algebraic curve C, one may associate a “hypercurve” arrangement, and one can...
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, each hypersurface being the...
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...
Let M be a simply connected closed manifold of dimension n. We study the rational homotopy type of t...
The investigation of the structure of the rational model of Sullivan on algebra of smooth differenti...
A toric arrangement is a finite set of hypersurfaces in a complex torus, every hypersurface being th...