Article
Licensed
Unlicensed
Requires Authentication
Divisors on the moduli spaces of stable maps to flag varieties and reconstruction
-
Dragos Oprea
Published/Copyright:
November 23, 2005
Abstract
We determine generators for the codimension 1 Chow
group of the moduli spaces of genus zero stable maps to flag varieties G | P. In the case of SL flags, we find all relations between our
generators, showing that they essentially come from 
. In addition, we
analyze the codimension 2 classes on the moduli spaces of stable maps to
Grassmannians and prove a new codimension 2 relation. This will lead to a
partial reconstruction theorem for the Grassmannian of 2
planes.
:
Published Online: 2005-11-23
Published in Print: 2005-09-27
Walter de Gruyter GmbH & Co. KG
You are currently not able to access this content.
You are currently not able to access this content.
Articles in the same Issue
- On saturation and the model theory of compact Kähler manifolds
- On the inverse problem in di¤erential Galois theory
- Block representation type of Frobenius kernels of smooth groups
- Mean curvature flow with free boundary on smooth hypersurfaces
- Geometric proofs of reciprocity laws
- L2-homology for von Neumann algebras
- Divisors on the moduli spaces of stable maps to flag varieties and reconstruction
- Minimums successifs des variétés toriques projectives
Articles in the same Issue
- On saturation and the model theory of compact Kähler manifolds
- On the inverse problem in di¤erential Galois theory
- Block representation type of Frobenius kernels of smooth groups
- Mean curvature flow with free boundary on smooth hypersurfaces
- Geometric proofs of reciprocity laws
- L2-homology for von Neumann algebras
- Divisors on the moduli spaces of stable maps to flag varieties and reconstruction
- Minimums successifs des variétés toriques projectives
