| dc.contributor.author |
Mishra, Rajat |
|
| dc.contributor.author |
Saha, Arnab |
|
| dc.coverage.spatial |
United Kingdom |
|
| dc.date.accessioned |
2025-05-09T08:23:30Z |
|
| dc.date.available |
2025-05-09T08:23:30Z |
|
| dc.date.issued |
2025-05 |
|
| dc.identifier.citation |
Mishra, Rajat and Saha, Arnab, "Differential characters and D-group schemes", International Mathematics Research Notices, DOI: 10.1093/imrn/rnaf109, vol. 2025, no. 09, May 2025. |
|
| dc.identifier.issn |
1073-7928 |
|
| dc.identifier.issn |
1687-0247 |
|
| dc.identifier.uri |
https://doi.org/10.1093/imrn/rnaf109 |
|
| dc.identifier.uri |
https://repository.iitgn.ac.in/handle/123456789/11380 |
|
| dc.description.abstract |
Let K be a field of characteristic zero with a fixed derivation ∂ on it. In the case when A is an abelian scheme, Buium considered the group scheme K(A) which is the kernel of differential characters (also known as Manin characters) on the jet space of A. Then K(A) naturally inherits a D-group scheme structure. Using the theory of universal vectorial extensions of A, he further showed that K(A) is a finite dimensional vectorial extension of A. Let G be a smooth connected commutative finite dimensional group scheme over Spec K. In this paper, using the theory of differential characters, we show that the associated kernel group scheme K(G) is a finite dimensional D-group scheme that is a vectorial extension of such a general G. Our proof relies entirely on understanding the structure of jet spaces. Our method also allows us to give a classification of the module of differential characters X∞(G) in terms of primitive characters as a K{∂}-module. |
|
| dc.description.statementofresponsibility |
by Rajat Mishra and Arnab Saha |
|
| dc.format.extent |
vol. 2025, no. 09 |
|
| dc.language.iso |
en_US |
|
| dc.publisher |
Oxford University Press |
|
| dc.title |
Differential characters and D-group schemes |
|
| dc.type |
Article |
|
| dc.relation.journal |
International Mathematics Research Notices |
|