Add to ORKGAbstract. Let W be a crystallographic Weyl group, and let TW be the com-plex toric variety attached to the fan of cones corresponding to the reflecting hyperplanes of W, and its weight lattice. The real locus TW (R) is a smooth, connected, compact manifold with a W-action. We give a formula for the Euler characteristic of TW (R) as a generalised character of W. In type An−1 for n odd, one obtains a generalised character of Sym n whose degree is (up to sign) the nth Euler number. 1
The role of the Euler characteristic inconfirmation of two independent forms of azeotropy rule and i...
AbstractIn this paper we show how to compute the Euler characteristic of a graph if we know the neig...
AbstractLet Σ denote the Coxeter complex of Sn, and let X(Σ) denote the associated toric variety. Si...
Let G be a countable discrete group and let M be a smooth proper cocompact G-manifold without bounda...
AbstractWe describe an equivariant version of the Euler characteristic in order to extend to the equ...
A toric variety is generally a torus, plus some “boundary components”. There is one associated with ...
We use the theory of cubic structures to give a fixed point Riemann-Roch formula for the equivariant...
AbstractThe Euler characteristic of Chow varieties of algebraic cycles of a given degree in complex ...
Abstract. Let G be a complex connected reductive group which is defined over R, let G be its Lie alg...
Let R be a reduced root system in a finite dimensional vector space V, N the associated weight latti...
AbstractThe Euler characteristic of a projectively flat manifold whose developing image lies in an a...
notion of Euler characteristic (for quotients of a torus by a finite group) which became known as th...
This paper has a twofold purpose. The first is to compute the Euler characteristics of hyperbolic Co...
AbstractLet G be a finite, complex reflection group acting on a complex vector space V, and δ its di...
We define a generalization of the Euler characteristic of a perfect complex of modules for the group...
The role of the Euler characteristic inconfirmation of two independent forms of azeotropy rule and i...
AbstractIn this paper we show how to compute the Euler characteristic of a graph if we know the neig...
AbstractLet Σ denote the Coxeter complex of Sn, and let X(Σ) denote the associated toric variety. Si...
Let G be a countable discrete group and let M be a smooth proper cocompact G-manifold without bounda...
AbstractWe describe an equivariant version of the Euler characteristic in order to extend to the equ...
A toric variety is generally a torus, plus some “boundary components”. There is one associated with ...
We use the theory of cubic structures to give a fixed point Riemann-Roch formula for the equivariant...
AbstractThe Euler characteristic of Chow varieties of algebraic cycles of a given degree in complex ...
Abstract. Let G be a complex connected reductive group which is defined over R, let G be its Lie alg...
Let R be a reduced root system in a finite dimensional vector space V, N the associated weight latti...
AbstractThe Euler characteristic of a projectively flat manifold whose developing image lies in an a...
notion of Euler characteristic (for quotients of a torus by a finite group) which became known as th...
This paper has a twofold purpose. The first is to compute the Euler characteristics of hyperbolic Co...
AbstractLet G be a finite, complex reflection group acting on a complex vector space V, and δ its di...
We define a generalization of the Euler characteristic of a perfect complex of modules for the group...
The role of the Euler characteristic inconfirmation of two independent forms of azeotropy rule and i...
AbstractIn this paper we show how to compute the Euler characteristic of a graph if we know the neig...
AbstractLet Σ denote the Coxeter complex of Sn, and let X(Σ) denote the associated toric variety. Si...
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