Add to ORKGExtending work of Bielawski-Dancer and Konno, we develop a theory of toric hyperkahler varieties, which involves toric geometry, matroid theory and convex polyhedra. The framework is a detailed study of semi-projective toric varieties, meaning GIT quotients of affine spaces by torus actions, and specifically, of Lawrence toric varieties, meaning GIT quotients of even-dimensional affine spaces by symplectic torus actions. A toric hyperkahler variety is a complete intersection in a Lawrence toric variety. Both varieties are non-compact, and they share the same cohomology ring, namely, the Stanley-Reisner ring of a matroid modulo a linear system of parameters. Familiar applications of toric geometry to combinatorics, including the Hard Lefsche...
We show that, for a complete simplicial toric variety X, we can determine its homotopy K-theory (den...
The objective of this essay is to introduce some of the broad theory involving toric varieties, and ...
A toric arrangement is a finite set of hypersurfaces in a complex torus, every hypersurface being th...
Extending work of Bielawski-Dancer [3] and Konno [14], we develop a theory of toric hyperkähler vari...
In this paper we survey geometric and arithmetic techniques to study the cohomology of semiprojectiv...
The K-rings of non-singular complex projective varieties as well as quasi-toric manifolds were descr...
A toric arrangement is a finite set of hypersurfaces in a complex torus, each hypersurface being the...
In this thesis we study the topology and geometry of hyperkähler quotients, as well as some related ...
According to Batyrev the Mori cone of a smooth, complete and projective toric variety can be generat...
In this dissertation, we first study complete intersections of hypersurfaces in toric varieties. We ...
We consider an orbifold X obtained by a Kähler reduction of Cn, and we define its “hyperkähler ana...
Toric varieties are varieties equipped with a torus action and constructed from cones and fans. In t...
Toric varieties are varieties equipped with a torus action and constructed from cones and fans. In t...
The objective of this essay is to introduce some of the broad theory involving toric varieties, and ...
Toric manifolds, the topological analogue of toric varieties, are determined by an n-dimensional sim...
We show that, for a complete simplicial toric variety X, we can determine its homotopy K-theory (den...
The objective of this essay is to introduce some of the broad theory involving toric varieties, and ...
A toric arrangement is a finite set of hypersurfaces in a complex torus, every hypersurface being th...
Extending work of Bielawski-Dancer [3] and Konno [14], we develop a theory of toric hyperkähler vari...
In this paper we survey geometric and arithmetic techniques to study the cohomology of semiprojectiv...
The K-rings of non-singular complex projective varieties as well as quasi-toric manifolds were descr...
A toric arrangement is a finite set of hypersurfaces in a complex torus, each hypersurface being the...
In this thesis we study the topology and geometry of hyperkähler quotients, as well as some related ...
According to Batyrev the Mori cone of a smooth, complete and projective toric variety can be generat...
In this dissertation, we first study complete intersections of hypersurfaces in toric varieties. We ...
We consider an orbifold X obtained by a Kähler reduction of Cn, and we define its “hyperkähler ana...
Toric varieties are varieties equipped with a torus action and constructed from cones and fans. In t...
Toric varieties are varieties equipped with a torus action and constructed from cones and fans. In t...
The objective of this essay is to introduce some of the broad theory involving toric varieties, and ...
Toric manifolds, the topological analogue of toric varieties, are determined by an n-dimensional sim...
We show that, for a complete simplicial toric variety X, we can determine its homotopy K-theory (den...
The objective of this essay is to introduce some of the broad theory involving toric varieties, and ...
A toric arrangement is a finite set of hypersurfaces in a complex torus, every hypersurface being th...