Inherently reductive IAPS
From Apstheory
Contents |
[edit] Definition
[edit] Symbol-free definition
An IAPS of groups is termed inherently reductive if it is reductive for every parabolic structure that can be given to it.
[edit] Definition with symbols
(fillin)
[edit] Property theory
[edit] Examples of inherently reductive IAPSes
Any power APS is inherently reductive, because here, the Failed to parse (Can't write to or create math temp directory): n^{th}
member itself equals every Levi subgroup.
The permutation IAPS is also inherently reductive.
