|Title:||On the dimensions of automorphism groups of 8-dimensional ternary fields I|
|Authors :||Bödi, Richard|
|Published in :||Journal of Geometry|
|Publisher / Ed. Institution :||Birkhäuser|
|Publisher / Ed. Institution:||Basel|
|License (according to publishing contract) :||Licence according to publishing contract|
|Type of review:||Peer review (Publication)|
|Subjects :||Automorphism group; Closed subgroup; Ternary field; Connected closed subgroup|
|Subject (DDC) :||500: Natural sciences and mathematics|
|Abstract:||Let τ be an eight-dimensional, connected, locally compact ternary field and let Γ denote a connected closed subgroup of its automorphism group which is taken with the compact-open topology. It is proved that Γ is either isomorphic to the compact exceptional Lie group G2, or the (covering) dimension of Γ is at most 11. This bound can be decreased to 10, if the ternary fixed fieldFΓ of Γ is connected.|
|Departement:||School of Engineering|
|Publication type:||Article in scientific Journal|
|Appears in Collections:||Publikationen School of Engineering|
Files in This Item:
There are no files associated with this item.
Items in DSpace are protected by copyright, with all rights reserved, unless otherwise indicated.