Add to ORKGToric geometry provides a bridge between algebraic geometry and combinatorics of fans and polytopes. For each polarized toric variety (X,L) we have associated a polytope P. In this thesis we use this correspondence to study birational geometry for toric varieties. To this end, we address subjects such as Minimal Model Program, Mori fiber spaces, and chamber structures on the cone of e?ective divisors. We translate some results from these theories to the combinatorics of polytopes and use them to get structure theorems on space of polytopes. In particular, we treat toric varieties known as 2-Fano, and we classify them in low dimensions
We study compactifications of subvarieties of algebraic tori using methods from the still developing...
We study compactifications of subvarieties of algebraic tori using methods from the still developing...
Toric varieties are a class of geometric objects with a combinatorial structure encoded in polytopes...
Toric geometry provides a bridge between algebraic geometry and combina-torics of fans and polytopes...
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 ...
In this survey, we first examine the notion of nonrational polytope and nonrational fan in the conte...
According to Batyrev the Mori cone of a smooth, complete and projective toric variety can be generat...
The thesis provides an introduction into the theory of affine and abstract toric vari- eties. In the...
My PhD is about syzygies of toric varieties and curves on toric surfaces. Toric geometry is a part o...
A toric arrangement is a finite set of hypersurfaces in a complex torus, each hypersurface being the...
Various questions related to birational properties of algebraic varieties are concerned. Rationally ...
The GIT chamber decomposition arising from a subtorus action on a polarized quasiprojective toric va...
In this paper we illustrate an algorithmic procedure which allows to build projective wonderful mode...
An algebraic variety is called rationally connected if two generic points can be connected by a curv...
We study compactifications of subvarieties of algebraic tori using methods from the still developing...
We study compactifications of subvarieties of algebraic tori using methods from the still developing...
Toric varieties are a class of geometric objects with a combinatorial structure encoded in polytopes...
Toric geometry provides a bridge between algebraic geometry and combina-torics of fans and polytopes...
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 ...
In this survey, we first examine the notion of nonrational polytope and nonrational fan in the conte...
According to Batyrev the Mori cone of a smooth, complete and projective toric variety can be generat...
The thesis provides an introduction into the theory of affine and abstract toric vari- eties. In the...
My PhD is about syzygies of toric varieties and curves on toric surfaces. Toric geometry is a part o...
A toric arrangement is a finite set of hypersurfaces in a complex torus, each hypersurface being the...
Various questions related to birational properties of algebraic varieties are concerned. Rationally ...
The GIT chamber decomposition arising from a subtorus action on a polarized quasiprojective toric va...
In this paper we illustrate an algorithmic procedure which allows to build projective wonderful mode...
An algebraic variety is called rationally connected if two generic points can be connected by a curv...
We study compactifications of subvarieties of algebraic tori using methods from the still developing...
We study compactifications of subvarieties of algebraic tori using methods from the still developing...
Toric varieties are a class of geometric objects with a combinatorial structure encoded in polytopes...