ORCID Profile
0000-0002-8837-5215
Current Organisation
University of Adelaide
Does something not look right? The information on this page has been harvested from data sources that may not be up to date. We continue to work with information providers to improve coverage and quality. To report an issue, use the Feedback Form.
Publisher: European Mathematical Society - EMS - Publishing House GmbH
Date: 25-02-2022
DOI: 10.4171/RMI/1330
Publisher: Elsevier BV
Date: 04-2016
Publisher: EMS Press
Date: 10-06-2010
DOI: 10.4171/079-1/18
Publisher: EMS Press
Date: 10-06-2010
DOI: 10.4171/079-1/17
Publisher: Springer Science and Business Media LLC
Date: 11-10-2000
Publisher: International Press of Boston
Date: 07-2007
Publisher: IOP Publishing
Date: 10-02-2012
Publisher: Springer Science and Business Media LLC
Date: 28-07-2018
Publisher: International Press of Boston
Date: 02-2020
Publisher: Wiley
Date: 03-06-2010
DOI: 10.1112/PLMS/PDQ012
Publisher: arXiv
Date: 2016
Publisher: World Scientific Pub Co Pte Lt
Date: 12-2017
DOI: 10.1142/S0129167X1750094X
Abstract: There are two well-known parabolic split [Formula: see text] geometries in dimension 5, [Formula: see text] distributions and [Formula: see text] contact structures. Here we link these two geometries with yet another [Formula: see text] related contact structure, which lives on a [Formula: see text]-manifold. More precisely, we present a natural geometric construction that associates to a [Formula: see text] distribution a [Formula: see text]-dimensional bundle endowed with a canonical Lie contact structure. We further study the relation between the canonical normal Cartan connections associated with the two structures and we show that the Cartan holonomy of the induced Lie contact structure reduces to [Formula: see text]. This motivates the study of the curved orbit decomposition associated with a [Formula: see text] reduced Lie contact structure on a [Formula: see text]-manifold. It is shown that, provided an additional curvature condition is satisfied, in a neighborhood of each point in the open curved orbit the structure descends to a [Formula: see text] distribution on a local leaf space. The closed orbit carries an induced [Formula: see text] contact structure.
Publisher: Elsevier BV
Date: 10-2006
Publisher: arXiv
Date: 2021
Publisher: Springer International Publishing
Date: 27-07-2021
Publisher: Springer Science and Business Media LLC
Date: 04-02-2010
Publisher: IOP Publishing
Date: 12-10-2010
Publisher: Springer Science and Business Media LLC
Date: 06-08-2015
Publisher: arXiv
Date: 2022
Publisher: Springer Science and Business Media LLC
Date: 25-02-2014
Publisher: Cambridge University Press
Date: 06-10-2020
Abstract: The 2019 'Australian-German Workshop on Differential Geometry in the Large' represented an extraordinary cross section of topics across differential geometry, geometric analysis and differential topology. The two-week programme featured talks from prominent keynote speakers from across the globe, treating geometric evolution equations, structures on manifolds, non-negative curvature and Alexandrov geometry, and topics in differential topology. A joy to the expert and novice alike, this proceedings volume touches on topics as erse as Ricci and mean curvature flow, geometric invariant theory, Alexandrov spaces, almost formality, prescribed Ricci curvature, and Kähler and Sasaki geometry.
Publisher: arXiv
Date: 2021
Publisher: Springer Science and Business Media LLC
Date: 03-2011
Publisher: Mathematical Sciences Publishers
Date: 25-07-2017
Publisher: Springer Science and Business Media LLC
Date: 13-08-2007
Publisher: Springer Science and Business Media LLC
Date: 29-04-2020
Publisher: Elsevier BV
Date: 10-2016
Publisher: Springer International Publishing
Date: 2018
Publisher: Elsevier BV
Date: 03-2014
Publisher: Walter de Gruyter GmbH
Date: 2009
Publisher: Elsevier BV
Date: 09-2006
No related grants have been discovered for Thomas Leistner.