The Cohomology of Real De Concini–procesi Models of Coxeter Type

Rational Cohomology of the Real Coxeter Toric Variety of Type A

The toric variety corresponding to the Coxeter fan of type A can also be described as a De Concini–Procesi wonderful model. Using a general result of Rains which relates cohomology of real De Concini–Procesi models to poset homology, we give formulas for the Betti numbers of the real toric variety, and the symmetric group representations on the rational cohomologies. We also show that the ratio...

The homology of real subspace arrangements

Associated to any subspace arrangement is a ‘De Concini–Procesi model’, a certain smooth compactification of its complement, which in the case of the braid arrangement produces the Deligne–Mumford compactification of the moduli space of genus 0 curves with marked points. In the present work, we calculate the integral homology of real De Concini–Procesi models, extending earlier work of Etingof,...

Abelianizing the Real Permutation Action via Blowups

Our object of study is an abelianization of the Sn permutation action on R n that is provided by a particular De Concini-Procesi wonderful model for the braid arrangement. Our motivation comes from an analogous construction for finite group actions on complex manifolds, due to Batyrev [B1, B2], and subsequent study of Borisov & Gunnells [BG], where the connection of such abelianizations with De...

Cohomology Bases for the De Concini -procesi Models of Hyperplane Arrangements and Sums over Trees

Incidence Combinatorics

We introduce notions of combinatorial blowups, building sets, and nested sets for arbitrary meet-semilattices. This gives a common abstract framework for the incidence combinatorics occurring in the context of De Concini-Procesi models of subspace arrangements and resolutions of singularities in toric varieties. Our main theorem states that a sequence of combinatorial blowups, prescribed by a b...