Mixing
Real froms of complex unipotent groups
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Let $G$ be a real linear group such that $G^mathbb C$ is its complexification group in $GL_n(mathbb C)$. Let $U$ be a unipotent complex Lie subgroup of $G^mathbb C$. Does $U$ have a real form i.e. $(Ucap G)^mathbb C=U$?
algebraic-geometry lie-groups lie-algebras algebraic-groups
asked Jul 21 at 10:01
Ronald
1,5841821
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Let $G$ be a real linear group such that $G^mathbb C$ is its complexification group in $GL_n(mathbb C)$. Let $U$ be a unipotent complex Lie subgroup of $G^mathbb C$. Does $U$ have a real form i.e. $(Ucap G)^mathbb C=U$?
algebraic-geometry lie-groups lie-algebras algebraic-groups
asked Jul 21 at 10:01
Ronald
1,5841821
I doubt it. Try taking $G = SU_2$, a compact group. The complexification is $SL_2(Bbb C)$, but the unipotent subgroups of this should have trivial intersection with $G$.
– Torsten Schoeneberg
Jul 21 at 18:23
add a comment |Â
up vote
1
down vote
favorite
up vote
1
down vote
favorite
Let $G$ be a real linear group such that $G^mathbb C$ is its complexification group in $GL_n(mathbb C)$. Let $U$ be a unipotent complex Lie subgroup of $G^mathbb C$. Does $U$ have a real form i.e. $(Ucap G)^mathbb C=U$?
algebraic-geometry lie-groups lie-algebras algebraic-groups
asked Jul 21 at 10:01
Ronald
1,5841821
Let $G$ be a real linear group such that $G^mathbb C$ is its complexification group in $GL_n(mathbb C)$. Let $U$ be a unipotent complex Lie subgroup of $G^mathbb C$. Does $U$ have a real form i.e. $(Ucap G)^mathbb C=U$?
algebraic-geometry lie-groups lie-algebras algebraic-groups
asked Jul 21 at 10:01
Ronald
1,5841821
asked Jul 21 at 10:01
Ronald
1,5841821
asked Jul 21 at 10:01
Ronald
1,5841821
asked Jul 21 at 10:01
Ronald
1,5841821
1,5841821
I doubt it. Try taking $G = SU_2$, a compact group. The complexification is $SL_2(Bbb C)$, but the unipotent subgroups of this should have trivial intersection with $G$.
– Torsten Schoeneberg
Jul 21 at 18:23
add a comment |Â
I doubt it. Try taking $G = SU_2$, a compact group. The complexification is $SL_2(Bbb C)$, but the unipotent subgroups of this should have trivial intersection with $G$.
– Torsten Schoeneberg
Jul 21 at 18:23
I doubt it. Try taking $G = SU_2$, a compact group. The complexification is $SL_2(Bbb C)$, but the unipotent subgroups of this should have trivial intersection with $G$.
– Torsten Schoeneberg
Jul 21 at 18:23
I doubt it. Try taking $G = SU_2$, a compact group. The complexification is $SL_2(Bbb C)$, but the unipotent subgroups of this should have trivial intersection with $G$.
– Torsten Schoeneberg
Jul 21 at 18:23
add a comment |Â
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I doubt it. Try taking $G = SU_2$, a compact group. The complexification is $SL_2(Bbb C)$, but the unipotent subgroups of this should have trivial intersection with $G$.
– Torsten Schoeneberg
Jul 21 at 18:23