Flexibility of Schubert classes
Publication
, Journal Article
Coskun, I; Robles, C
Published in: Differential Geometry and Its Application
December 1, 2013
In this note, we discuss the flexibility of Schubert classes in homogeneous varieties. We give several constructions for representing multiples of a Schubert class by irreducible subvarieties. We sharpen [22, Theorem 3.1] by proving that every positive multiple of an obstructed class in a cominuscule homogeneous variety can be represented by an irreducible subvariety. © 2013 Elsevier B.V.
Duke Scholars
Published In
Differential Geometry and Its Application
DOI
ISSN
0926-2245
Publication Date
December 1, 2013
Volume
31
Issue
6
Start / End Page
759 / 774
Related Subject Headings
- General Mathematics
- 4904 Pure mathematics
- 0101 Pure Mathematics
Citation
APA
Chicago
ICMJE
MLA
NLM
Coskun, I., & Robles, C. (2013). Flexibility of Schubert classes. Differential Geometry and Its Application, 31(6), 759–774. https://doi.org/10.1016/j.difgeo.2013.09.003
Coskun, I., and C. Robles. “Flexibility of Schubert classes.” Differential Geometry and Its Application 31, no. 6 (December 1, 2013): 759–74. https://doi.org/10.1016/j.difgeo.2013.09.003.
Coskun I, Robles C. Flexibility of Schubert classes. Differential Geometry and Its Application. 2013 Dec 1;31(6):759–74.
Coskun, I., and C. Robles. “Flexibility of Schubert classes.” Differential Geometry and Its Application, vol. 31, no. 6, Dec. 2013, pp. 759–74. Scopus, doi:10.1016/j.difgeo.2013.09.003.
Coskun I, Robles C. Flexibility of Schubert classes. Differential Geometry and Its Application. 2013 Dec 1;31(6):759–774.
Published In
Differential Geometry and Its Application
DOI
ISSN
0926-2245
Publication Date
December 1, 2013
Volume
31
Issue
6
Start / End Page
759 / 774
Related Subject Headings
- General Mathematics
- 4904 Pure mathematics
- 0101 Pure Mathematics