Add to ORKGIn [6] Davis-Januszkiewicz introduced the notion of quasi-toric manifolds as that of compact torus actions on nonsingular projective toric varieties and showed that they still have many combinatorial properties as in the case of toric varieties. Toric varieties are in one-to-one correspondence with fans which are combinatorial object
According to Batyrev the Mori cone of a smooth, complete and projective toric variety can be generat...
This book is about toric topology, a new area of mathematics that emerged at the end of the 1990s on...
Our primary aim is to develop a theory of equivariant genera for stably complex manifolds equipped...
The K-rings of non-singular complex projective varieties as well as quasi-toric manifolds were descr...
In algebraic geometry actions of the torus \( (C^∗)^n \) on algebraic varieties with nice properties...
In algebraic geometry actions of the torus \( (C^∗)^n \) on algebraic varieties with nice properties...
The $K$-rings of non-singular complex projective varieties as well as quasi-toric manifolds were des...
A toric prevariety is a normal complex prevariety endowed with an effective regular torus action tha...
Quasitoric manifolds are manifolds that admit an action of the torus that is locally the same as the...
Here, the study of torus actions on topological spaces is presented as a bridge connecting combinato...
Our aim is to bring the theory of analogous polytopes to bear on the study of quasitoric manifolds, ...
AbstractWe introduce the notion of a local torus action modeled on the standard representation (for ...
These notes are intended to give a brief and informal introduction to the topology of torus manifold...
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 ...
According to Batyrev the Mori cone of a smooth, complete and projective toric variety can be generat...
This book is about toric topology, a new area of mathematics that emerged at the end of the 1990s on...
Our primary aim is to develop a theory of equivariant genera for stably complex manifolds equipped...
The K-rings of non-singular complex projective varieties as well as quasi-toric manifolds were descr...
In algebraic geometry actions of the torus \( (C^∗)^n \) on algebraic varieties with nice properties...
In algebraic geometry actions of the torus \( (C^∗)^n \) on algebraic varieties with nice properties...
The $K$-rings of non-singular complex projective varieties as well as quasi-toric manifolds were des...
A toric prevariety is a normal complex prevariety endowed with an effective regular torus action tha...
Quasitoric manifolds are manifolds that admit an action of the torus that is locally the same as the...
Here, the study of torus actions on topological spaces is presented as a bridge connecting combinato...
Our aim is to bring the theory of analogous polytopes to bear on the study of quasitoric manifolds, ...
AbstractWe introduce the notion of a local torus action modeled on the standard representation (for ...
These notes are intended to give a brief and informal introduction to the topology of torus manifold...
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 ...
According to Batyrev the Mori cone of a smooth, complete and projective toric variety can be generat...
This book is about toric topology, a new area of mathematics that emerged at the end of the 1990s on...
Our primary aim is to develop a theory of equivariant genera for stably complex manifolds equipped...