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Abstract We investigate Levi subgroups of a connected reductive algebraic group G , over a ground field K. We parametrize their conjugacy classes in terms of sets of simple roots… Click to show full abstract
Abstract We investigate Levi subgroups of a connected reductive algebraic group G , over a ground field K. We parametrize their conjugacy classes in terms of sets of simple roots and we prove that two Levi K-subgroups of G are rationally conjugate if and only if they are geometrically conjugate. These results are generalized to arbitrary connected linear algebraic K-groups. In that setting the appropriate analogue of a Levi subgroup is derived from the notion of a pseudo-parabolic subgroup.
Keywords:
conjugacy levi;
linear algebraic;
levi subgroups;
algebraic groups
Journal Title: Journal of Pure and Applied Algebra
Year Published: 2020
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Journal Title: Journal of Pure and Applied Algebra
Year Published: 2020
Link to full text (if available)
Share on Social Media: Sign Up to like & get
recommendations!