Families of distributions and pfaff systems under duality
A singular distribution on a non-singular variety X can be defined either by a subsheaf D ⊆ TX of the tangent sheaf, or by the zeros of a subsheaf D0 ⊆ Ω1 X of 1-forms, that is, a Pfaff system. Although both definitions are equivalent under mild conditions on D, they give rise, in general, to non-eq...
Guardado en:
| Autor principal: | |
|---|---|
| Publicado: |
2015
|
| Materias: | |
| Acceso en línea: | https://bibliotecadigital.exactas.uba.ar/collection/paper/document/paper_19492006_v11_n_p164_Quallbrunn http://hdl.handle.net/20.500.12110/paper_19492006_v11_n_p164_Quallbrunn |
| Aporte de: |
| id |
paper:paper_19492006_v11_n_p164_Quallbrunn |
|---|---|
| record_format |
dspace |
| spelling |
paper:paper_19492006_v11_n_p164_Quallbrunn2023-06-08T16:32:36Z Families of distributions and pfaff systems under duality Quallbrunn, Federico Algebraic foliations Coherent sheaves Flat families Kupka singularities Moduli spaces A singular distribution on a non-singular variety X can be defined either by a subsheaf D ⊆ TX of the tangent sheaf, or by the zeros of a subsheaf D0 ⊆ Ω1 X of 1-forms, that is, a Pfaff system. Although both definitions are equivalent under mild conditions on D, they give rise, in general, to non-equivalent notions of flat families of distributions. In this work we investigate conditions under which both notions of flat families are equivalent. In the last sections we focus on the case where the distribution is integrable, and we use our results to generalize a theorem of Cukierman and Pereira. © 2015, Worldwide Center of Mathematics. All Rights Reserved. Fil:Quallbrunn, F. Universidad de Buenos Aires. Facultad de Ciencias Exactas y Naturales; Argentina. 2015 https://bibliotecadigital.exactas.uba.ar/collection/paper/document/paper_19492006_v11_n_p164_Quallbrunn http://hdl.handle.net/20.500.12110/paper_19492006_v11_n_p164_Quallbrunn |
| institution |
Universidad de Buenos Aires |
| institution_str |
I-28 |
| repository_str |
R-134 |
| collection |
Biblioteca Digital - Facultad de Ciencias Exactas y Naturales (UBA) |
| topic |
Algebraic foliations Coherent sheaves Flat families Kupka singularities Moduli spaces |
| spellingShingle |
Algebraic foliations Coherent sheaves Flat families Kupka singularities Moduli spaces Quallbrunn, Federico Families of distributions and pfaff systems under duality |
| topic_facet |
Algebraic foliations Coherent sheaves Flat families Kupka singularities Moduli spaces |
| description |
A singular distribution on a non-singular variety X can be defined either by a subsheaf D ⊆ TX of the tangent sheaf, or by the zeros of a subsheaf D0 ⊆ Ω1 X of 1-forms, that is, a Pfaff system. Although both definitions are equivalent under mild conditions on D, they give rise, in general, to non-equivalent notions of flat families of distributions. In this work we investigate conditions under which both notions of flat families are equivalent. In the last sections we focus on the case where the distribution is integrable, and we use our results to generalize a theorem of Cukierman and Pereira. © 2015, Worldwide Center of Mathematics. All Rights Reserved. |
| author |
Quallbrunn, Federico |
| author_facet |
Quallbrunn, Federico |
| author_sort |
Quallbrunn, Federico |
| title |
Families of distributions and pfaff systems under duality |
| title_short |
Families of distributions and pfaff systems under duality |
| title_full |
Families of distributions and pfaff systems under duality |
| title_fullStr |
Families of distributions and pfaff systems under duality |
| title_full_unstemmed |
Families of distributions and pfaff systems under duality |
| title_sort |
families of distributions and pfaff systems under duality |
| publishDate |
2015 |
| url |
https://bibliotecadigital.exactas.uba.ar/collection/paper/document/paper_19492006_v11_n_p164_Quallbrunn http://hdl.handle.net/20.500.12110/paper_19492006_v11_n_p164_Quallbrunn |
| work_keys_str_mv |
AT quallbrunnfederico familiesofdistributionsandpfaffsystemsunderduality |
| _version_ |
1768542102942121984 |