Add to ORKGA toric prevariety is a normal complex prevariety endowed with an effective regular torus action that has a dense orbit. We introduce the concept of a system of fans in a lattice and obtain an equivalence of the category of systems of fans and the category of toric prevarieties. For every toric prevariety X we construct a toric morphism X ! Y to a toric variety Y that is universal with respect to toric morphisms from X to toric varieties
According to Batyrev the Mori cone of a smooth, complete and projective toric variety can be generat...
Toric varieties are varieties equipped with a torus action and constructed from cones and fans. In t...
AbstractToric dynamical systems are known as complex balancing mass action systems in the mathematic...
AbstractLet D be an integer matrix. A toric set, namely the points in Kn parametrized by the columns...
In [6] Davis-Januszkiewicz introduced the notion of quasi-toric manifolds as that of compact torus a...
Given two finite fans in isomorphic lattices, there is an algorithm for telling when the associated ...
Given two finite fans in isomorphic lattices, there is an algorithm for telling when the associated ...
The objective of this essay is to introduce some of the broad theory involving toric varieties, and ...
The objective of this essay is to introduce some of the broad theory involving toric varieties, and ...
Mu-Wan Huang, Mark Walker and I established an explicit formula for the equivariant K-groups of affi...
Mu-Wan Huang, Mark Walker and I established an explicit formula for the equivariant K-groups of affi...
Mu-Wan Huang, Mark Walker and I established an explicit formula for the equivariant K-groups of affi...
A toric variety is a geometric object containing an algebraic torus as a Zariski open, dense subset....
The thesis provides an introduction into the theory of affine and abstract toric vari- eties. In the...
The GIT chamber decomposition arising from a subtorus action on a polarized quasiprojective toric va...
According to Batyrev the Mori cone of a smooth, complete and projective toric variety can be generat...
Toric varieties are varieties equipped with a torus action and constructed from cones and fans. In t...
AbstractToric dynamical systems are known as complex balancing mass action systems in the mathematic...
AbstractLet D be an integer matrix. A toric set, namely the points in Kn parametrized by the columns...
In [6] Davis-Januszkiewicz introduced the notion of quasi-toric manifolds as that of compact torus a...
Given two finite fans in isomorphic lattices, there is an algorithm for telling when the associated ...
Given two finite fans in isomorphic lattices, there is an algorithm for telling when the associated ...
The objective of this essay is to introduce some of the broad theory involving toric varieties, and ...
The objective of this essay is to introduce some of the broad theory involving toric varieties, and ...
Mu-Wan Huang, Mark Walker and I established an explicit formula for the equivariant K-groups of affi...
Mu-Wan Huang, Mark Walker and I established an explicit formula for the equivariant K-groups of affi...
Mu-Wan Huang, Mark Walker and I established an explicit formula for the equivariant K-groups of affi...
A toric variety is a geometric object containing an algebraic torus as a Zariski open, dense subset....
The thesis provides an introduction into the theory of affine and abstract toric vari- eties. In the...
The GIT chamber decomposition arising from a subtorus action on a polarized quasiprojective toric va...
According to Batyrev the Mori cone of a smooth, complete and projective toric variety can be generat...
Toric varieties are varieties equipped with a torus action and constructed from cones and fans. In t...
AbstractToric dynamical systems are known as complex balancing mass action systems in the mathematic...