Add to ORKGLet G be a simple algebraic group. Labelled trivalent graphs called webs can be used to product invariants in tensor products of minuscule representations. For each web, we construct a configuration space of points in the affine Grassmannian. Via the geometric Satake correspondence, we relate these configuration spaces to the invariant vectors coming from webs. In the case G = SL(3), non-elliptic webs yield a basis for the invariant spaces. The non-elliptic condition, which is equivalent to the condition that the dual diskoid of the web is CAT(0), is explained by the fact that affine buildings are CAT(0)
Since their popularization by Gromov in the eighties, CAT(0) metric spaces of bounded curvature as d...
A combinatorial map is a connected topological graph cellularly embedded in a surface. This monograp...
This book takes an in-depth look at abelian relations of codimension one webs in the complex analyti...
ABSTRACT. Let G be a simple algebraic group. Labelled trivalent graphs called webs can be used to pr...
Let G be a simple algebraic group. Labelled trivalent graphs called webs can be used to produce inva...
Combinatorial spiders are a model for the invariant space of the tensor product of representations. ...
The irreducible representations of symmetric groups can be realized as certain graded pieces of inva...
AbstractGiven a combinatorial geometry (or “matroid”) M, defined on a finite set E, a certain abelia...
The usual Poincare ́ map is defined for a four-web admitting three independent Abelian relations, an...
International audienceThe $A_2$-spider category encodes the representation theory of the $sl_3$ quan...
Spin networks are graphs derived from 3nj symbols of angular momentum. The surface embedding, the to...
Abstract. The geometric Satake equivalence of Ginzburg and Mirković– Vilonen, for a complex reducti...
O. In t roduct ion There are several approaches to the construction of invariants of a three-dimensi...
We study lattices acting on $\textrm{CAT}(0)$ spaces via their commensurated subgroups. To do this w...
Mirkovic and Vilonen give a proof of the geometric Satake correspondence which provides a natural ba...
Since their popularization by Gromov in the eighties, CAT(0) metric spaces of bounded curvature as d...
A combinatorial map is a connected topological graph cellularly embedded in a surface. This monograp...
This book takes an in-depth look at abelian relations of codimension one webs in the complex analyti...
ABSTRACT. Let G be a simple algebraic group. Labelled trivalent graphs called webs can be used to pr...
Let G be a simple algebraic group. Labelled trivalent graphs called webs can be used to produce inva...
Combinatorial spiders are a model for the invariant space of the tensor product of representations. ...
The irreducible representations of symmetric groups can be realized as certain graded pieces of inva...
AbstractGiven a combinatorial geometry (or “matroid”) M, defined on a finite set E, a certain abelia...
The usual Poincare ́ map is defined for a four-web admitting three independent Abelian relations, an...
International audienceThe $A_2$-spider category encodes the representation theory of the $sl_3$ quan...
Spin networks are graphs derived from 3nj symbols of angular momentum. The surface embedding, the to...
Abstract. The geometric Satake equivalence of Ginzburg and Mirković– Vilonen, for a complex reducti...
O. In t roduct ion There are several approaches to the construction of invariants of a three-dimensi...
We study lattices acting on $\textrm{CAT}(0)$ spaces via their commensurated subgroups. To do this w...
Mirkovic and Vilonen give a proof of the geometric Satake correspondence which provides a natural ba...
Since their popularization by Gromov in the eighties, CAT(0) metric spaces of bounded curvature as d...
A combinatorial map is a connected topological graph cellularly embedded in a surface. This monograp...
This book takes an in-depth look at abelian relations of codimension one webs in the complex analyti...