A note on Belyi's theorem for Klein surfaces
A note on Belyi's theorem for Klein surfaces
Singerman and the first named author have recently developed a real Belyi thoery, leaving open a particular case in the proof of Belyi's theorem for Klein surfaces. We answer their question affirmatively by a descent argument which turns out to extend to a much more general context.
103-107
Koeck, Bernhard
84d11519-7828-43a6-852b-0c1b80edeef9
Lau, Eike
9d720437-eb88-411b-9331-ffad95742525
2010
Koeck, Bernhard
84d11519-7828-43a6-852b-0c1b80edeef9
Lau, Eike
9d720437-eb88-411b-9331-ffad95742525
Koeck, Bernhard and Lau, Eike
(2010)
A note on Belyi's theorem for Klein surfaces.
Quarterly Journal of Mathematics, 61 (1), .
(doi:10.1093/qmath/han034).
Abstract
Singerman and the first named author have recently developed a real Belyi thoery, leaving open a particular case in the proof of Belyi's theorem for Klein surfaces. We answer their question affirmatively by a descent argument which turns out to extend to a much more general context.
Text
NoteBelyi5.pdf
- Author's Original
More information
Published date: 2010
Organisations:
Pure Mathematics
Identifiers
Local EPrints ID: 63274
URI: http://eprints.soton.ac.uk/id/eprint/63274
ISSN: 0033-5606
PURE UUID: 843a4c4d-d154-489d-856c-77dc95b040d6
Catalogue record
Date deposited: 25 Sep 2008
Last modified: 16 Mar 2024 03:22
Export record
Altmetrics
Contributors
Author:
Eike Lau
Download statistics
Downloads from ePrints over the past year. Other digital versions may also be available to download e.g. from the publisher's website.
View more statistics