Sobolev-Gaffney type inequalities for differential forms on sub-Riemannian contact manifolds with bounded geometry

Baldi, Annalisa; Tesi, Maria Carla; Tripaldi, Francesca (2022). Sobolev-Gaffney type inequalities for differential forms on sub-Riemannian contact manifolds with bounded geometry. Advanced nonlinear studies, 22(1), pp. 484-516. De Gruyter 10.1515/ans-2022-0022

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In this article, we establish a Gaffney type inequality, in Wℓ,p -Sobolev spaces, for differential forms on sub-Riemannian contact manifolds without boundary, having bounded geometry (hence, in particular, we have in mind noncompact manifolds). Here, p∈]1,∞[ and ℓ=1,2 depending on the order of the differential form we are considering. The proof relies on the structure of the Rumin’s complex of differential forms in contact manifolds, on a Sobolev-Gaffney inequality proved by Baldi-Franchi in the setting of the Heisenberg groups and on some geometric properties that can be proved for sub-Riemannian contact manifolds with bounded geometry.

Item Type:

Journal Article (Original Article)

Division/Institute:

08 Faculty of Science > Department of Mathematics and Statistics > Institute of Mathematics

UniBE Contributor:

Tripaldi, Francesca

Subjects:

500 Science > 510 Mathematics

ISSN:

2169-0375

Publisher:

De Gruyter

Funders:

[4] Swiss National Science Foundation ; [222] Horizon 2020 ; [UNSPECIFIED] University of Bologna, funds for selected research topics ; [UNSPECIFIED] GNAMPA of INdAM

Language:

English

Submitter:

Francesca Tripaldi

Date Deposited:

24 Oct 2022 15:59

Last Modified:

05 Dec 2022 16:26

Publisher DOI:

10.1515/ans-2022-0022

ArXiv ID:

2203.13701

BORIS DOI:

10.48350/174028

URI:

https://boris.unibe.ch/id/eprint/174028

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