Rational points and Coxeter group actions on the cohomology of toric varieties

Gustav I. Lehrer

Displaying similar documents to “Rational points and Coxeter group actions on the cohomology of toric varieties”

Smooth components of Springer fibers

William Graham, R. Zierau (2011)

Annales de l’institut Fourier

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This article studies components of Springer fibers for $𝔤𝔩 (n)$ that are associated to closed orbits of $G L (p) \times G L (q)$ on the flag variety of $G L (n), n = p + q$ . These components occur in any Springer fiber. In contrast to the case of arbitrary components, these components are smooth varieties. Using results of Barchini and Zierau we show these components are iterated bundles and are stable under the action of a maximal torus of $G L (n)$ . We prove that if $ℒ$ is a line bundle on the flag variety associated to a dominant weight,...

Local coordinates for $SL (n, C)$ -character varieties of finite-volume hyperbolic 3-manifolds

Pere Menal-Ferrer, Joan Porti (2012)

Annales mathématiques Blaise Pascal

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Given a finite-volume hyperbolic 3-manifold, we compose a lift of the holonomy in $SL (2, C)$ with the $n$ -dimensional irreducible representation of $SL (2, C)$ in $SL (n, C)$ . In this paper we give local coordinates of the $SL (n, C)$ -character variety around the character of this representation. As a corollary, this representation is isolated among all representations that are unipotent at the cusps.

Effective equidistribution of S-integral points on symmetric varieties

Yves Benoist, Hee Oh (2012)

Annales de l’institut Fourier

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Let $K$ be a global field of characteristic not 2. Let $Z = H ∖ G$ be a symmetric variety defined over $K$ and $S$ a finite set of places of $K$ . We obtain counting and equidistribution results for the S-integral points of $Z$ . Our results are effective when $K$ is a number field.

Linear maps preserving orbits

Gerald W. Schwarz (2012)

Annales de l’institut Fourier

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Let $H \subset GL (V)$ be a connected complex reductive group where $V$ is a finite-dimensional complex vector space. Let $v \in V$ and let $G = {g \in GL (V) ∣ g H v = H v}$ . Following Raïs we say that the orbit $H v$ is if the identity component of $G$ is $H$ . If $H$ is semisimple, we say that $H v$ is for $H$ if the identity component of $G$ is an extension of $H$ by a torus. We classify the $H$ -orbits which are not (semi)-characteristic in many cases.

Maximal compatible splitting and diagonals of Kempf varieties

Niels Lauritzen, Jesper Funch Thomsen (2011)

Annales de l’institut Fourier

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Lakshmibai, Mehta and Parameswaran (LMP) introduced the notion of maximal multiplicity vanishing in Frobenius splitting. In this paper we define the algebraic analogue of this concept and construct a Frobenius splitting vanishing with maximal multiplicity on the diagonal of the full flag variety. Our splitting induces a diagonal Frobenius splitting of maximal multiplicity for a special class of smooth Schubert varieties first considered by Kempf. Consequences are Frobenius splitting...

Displaying similar documents to “Rational points and Coxeter group actions on the cohomology of toric varieties”

Smooth components of Springer fibers

Local coordinates for SL ( n , C ) -character varieties of finite-volume hyperbolic 3-manifolds

Effective equidistribution of S-integral points on symmetric varieties

Linear maps preserving orbits

Maximal compatible splitting and diagonals of Kempf varieties

Local coordinates for $SL (n, C)$ -character varieties of finite-volume hyperbolic 3-manifolds