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Displaying 101 – 120 of 166

On twisted exponential sums.

Alan Adolphson, Steven Sperber (1991)

Mathematische Annalen

Paradan’s wall crossing formula for partition functions and Khovanski-Pukhlikov differential operator

Arzu Boysal, Michèle Vergne (2009)

Annales de l’institut Fourier

Let $P (s)$ be a family of rational polytopes parametrized by inequations. It is known that the volume of $P (s)$ is a locally polynomial function of the parameters. Similarly, the number of integral points in $P (s)$ is a locally quasi-polynomial function of the parameters. Paul-Émile Paradan proved a jump formula for this function, when crossing a wall. In this article, we give an algebraic proof of this formula. Furthermore, we give a residue formula for the jump, which enables us to compute it.

Pentes algébriques et pentes analytiques d’un $𝒟$ -module

Yves Laurent, Zoghman Mebkhout (1999)

Annales scientifiques de l'École Normale Supérieure

Picard Numbers of Surfaces in 3-Dimensional Weighted Projective Spaces.

David A. Cox (1989)

Mathematische Zeitschrift

Piecewise polynomial functions, convex polytopes and enumerative geometry

Michel Brion (1996)

Banach Center Publications

Points entiers dans les polytopes convexes

Michel Brion (1993/1994)

Séminaire Bourbaki

Polyèdre de Newton et distribution f... +. II.

Jan Denef, Patrick Sargos (1992)

Mathematische Annalen

Polygons with hidden vertices.

Ewald, Günter (2001)

Beiträge zur Algebra und Geometrie

Polytopal linear algebra.

Bruns, Winfried, Gubeladze, Joseph (2002)

Beiträge zur Algebra und Geometrie

Polytopes secondaires et discriminants

François Loeser (1990/1991)

Séminaire Bourbaki

Positivity properties of toric vector bundles

Milena Hering, Mircea Mustaţă, Sam Payne (2010)

Annales de l’institut Fourier

We show that a torus-equivariant vector bundle on a complete toric variety is nef or ample if and only if its restriction to every invariant curve is nef or ample, respectively. Furthermore, we show that nef toric vector bundles have a nonvanishing global section at every point and deduce that the underlying vector bundle is trivial if and only if its restriction to every invariant curve is trivial. We apply our methods and results to study, in particular, the vector bundles $ℳ_{L}$ that arise as the...

Principal parts of line bundles on toric varieties

David Perkinson (1996)

Compositio Mathematica

Projective embeddings of toric varieties

Richard Scott (1999)

Colloquium Mathematicae

Pulling back cohomology classes and dynamical degrees of monomial maps

Jan-Li Lin (2012)

Bulletin de la Société Mathématique de France

We study the pullback maps on cohomology groups for equivariant rational maps (i.e., monomial maps) on toric varieties. Our method is based on the intersection theory on toric varieties. We use the method to determine the dynamical degrees of monomial maps and compute the degrees of the Cremona involution.

Quaternionic geometry of matroids

Tamás Hausel (2005)

Open Mathematics

Building on a recent paper [8], here we argue that the combinatorics of matroids are intimately related to the geometry and topology of toric hyperkähler varieties. We show that just like toric varieties occupy a central role in Stanley’s proof for the necessity of McMullen’s conjecture (or g-inequalities) about the classification of face vectors of simplicial polytopes, the topology of toric hyperkähler varieties leads to new restrictions on face vectors of matroid complexes. Namely in this paper...

Quelques questions d’approximation faible pour les tores algébriques

Jean-Louis Colliot-Thélène, Venapally Suresh (2007)

Annales de l’institut Fourier

Soient $K$ un corps global, $T$ un $K$ -tore, $S$ un ensemble fini de places de $K$ . On note $K_{v}$ le complété de $K$ en $v \in S$ . Soit $T (K)$ , resp. $T (K_{v})$ , le groupe des points $K$ -rationnels, resp. $K_{v}$ -rationnels, de $T$ . Notons $T (O_{v}) \subset T (K_{v})$ le sous-groupe compact maximal. Nous montrons que pour $T$ et $S$ convenables l’application $T (K) \to \prod_{v \in S} T (K_{v}) / T (O_{v})$ induite par l’application diagonale n’est pas surjective. Cela implique que pour $v$ convenable le groupe $T (O_{v})$ ne couvre pas forcément toutes les classes de $R$ -équivalence de $T (K_{v})$ . Lorsque $K$ est un corps de fonctions d’une variable...

Quotients of an affine variety by an action of a torus

Olga Chuvashova, Nikolay Pechenkin (2013)

Open Mathematics

Let X be an affine T-variety. We study two different quotients for the action of T on X: the toric Chow quotient X/C T and the toric Hilbert scheme H. We introduce a notion of the main component H 0 of H, which parameterizes general T-orbit closures in X and their flat limits. The main component U 0 of the universal family U over H is a preimage of H 0. We define an analogue of a universal family WX over the main component of X/C T. We show that the toric Chow morphism restricted on the main components...

Quotients of toric varieties.

M.M. Kapranov, B. Sturmfels (1991)

Mathematische Annalen

Quotients of toric varieties by actions of subtori

Joanna Święcicka (1999)

Colloquium Mathematicae

Let X be an algebraic toric variety with respect to an action of an algebraic torus S. Let Σ be the corresponding fan. The aim of this paper is to investigate open subsets of X with a good quotient by the (induced) action of a subtorus T ⊂ S. It turns out that it is enough to consider open S-invariant subsets of X with a good quotient by T. These subsets can be described by subfans of Σ. We give a description of such subfans and also a description of fans corresponding to quotient varieties. Moreover,...

Rational intersection cohomology of projective toric varieties.

Karl-Heinz Fieseler (1991)

Journal für die reine und angewandte Mathematik

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