Por favor, use este identificador para citar o enlazar a este item:
http://hdl.handle.net/10261/230168
COMPARTIR / EXPORTAR:
SHARE CORE BASE | |
Visualizar otros formatos: MARC | Dublin Core | RDF | ORE | MODS | METS | DIDL | DATACITE | |
Título: | SO (p, q) -Higgs bundles and Higher Teichmüller components |
Autor: | Aparicio-Arroyo, M.; Bradlow, S.; Collier, B.; García-Prada, Óscar; Gothen, P.B.; Oliveira, A. | Fecha de publicación: | 2019 | Editor: | Springer Nature | Citación: | Inventiones Mathematicae (2019) | Resumen: | Some connected components of a moduli space are mundane in the sense that they are distinguished only by obvious topological invariants or have no special characteristics. Others are more alluring and unusual either because they are not detected by primary invariants, or because they have special geometric significance, or both. In this paper we describe new examples of such ‘exotic’ components in moduli spaces of SO (p, q) -Higgs bundles on closed Riemann surfaces or, equivalently, moduli spaces of surface group representations into the Lie group SO (p, q). Furthermore, we discuss how these exotic components are related to the notion of positive Anosov representations recently developed by Guichard and Wienhard. We also provide a complete count of the connected ff q⩾ 4). | Versión del editor: | http://dx.doi.org/10.1007/s00222-019-00885-2 | URI: | http://hdl.handle.net/10261/230168 | DOI: | 10.1007/s00222-019-00885-2 | Identificadores: | doi: 10.1007/s00222-019-00885-2 issn: 0020-9910 |
Aparece en las colecciones: | (ICMAT) Artículos |
Ficheros en este ítem:
Fichero | Descripción | Tamaño | Formato | |
---|---|---|---|---|
(SO PQ) - POSTPRINT.pdf | 1,04 MB | Adobe PDF | Visualizar/Abrir |
CORE Recommender
SCOPUSTM
Citations
8
checked on 03-may-2024
WEB OF SCIENCETM
Citations
6
checked on 24-feb-2024
Page view(s)
44
checked on 16-may-2024
Download(s)
172
checked on 16-may-2024
Google ScholarTM
Check
Altmetric
Altmetric
NOTA: Los ítems de Digital.CSIC están protegidos por copyright, con todos los derechos reservados, a menos que se indique lo contrario.