Lie algebras. Lecture 10: Cartan subalgebras of semisimple Lie algebras (by Walter Mazorchuk)
The Lie-algebra of Quaternion algebras and their Lie-subalgebras
Lie Algebras 2 -- Subalgebras and Ideals
Lie groups and Lie algebras: sl(2,C) subalgebras in general, 2
Group Theory L15V1: Cartan Subalgebra
Lie algebras. Lecture 9: Cartan subalgebras (by Walter Mazorchuk)
On Conjugacy of Cartan Subalgebras in Extended Affine Lie Algebras and Classification of Torsors...
Natural sl(2) subalgebras in any* Lie algebra -- Lie algebras 17
Tevian Dray - Subalgebras of the Split Octonions - JMM2018 AMS Quaternion Special Session
Bernard Leclerc, \"Representations of Borel subalgebras of quantum loop algebras\"
Vasyl Chupordia, On Leibniz algebras with maximal cyclic subalgebras
Teresa Conde: Medley on exact Borel subalgebras
There Is No Odd Subalgebra
Stone-Weierstrass: unital subalgebra and separation of points
Stefaan Vaes - Classification of regular subalgebras of the hyperfinite II1 factor
Leonid Rybnikov: Bethe subalgebras in Yangians and the wonderful compactification 17.12.2019
C*-algebras 6: The Gelfand Transform
Group Theory L12V3: Generators of SO(n) and the Cartan Subalgebra
Rolando de Santiago: \"L2 cohomology and maximal rigid subalgebras of s-malleable deformations\"
قد يعجبك أيضا
Lie -
algebras. -
Lecture -
10: -
Cartan -
subalgebras -
of -
semisimple -
Lie -
algebras -
(by -
Walter -
Mazorchuk) -
The -
Lie-algebra -
of -
Quaternion -
algebras -
and -
their -
Lie-subalgebras -
Lie -
Algebras -
2 -
-- -
Subalgebras -
and -
Ideals -
Lie -
groups -
and -
Lie -
algebras: -
sl(2,C) -
subalgebras -
in -
general, -
2 -
Group -
Theory -
L15V1: -
Cartan -
Subalgebra -
Lie -
algebras. -
Lecture -
9: -
Cartan -
subalgebras -
(by -
Walter -
Mazorchuk) -
On -
Conjugacy -
of -
Cartan -
Subalgebras -
in -
Extended -
Affine -
Lie -
Algebras -
and -
Classification -
of -
Torsors... -
Natural -
sl(2) -
subalgebras -
in -
any* -
Lie -
algebra -
-- -
Lie -
algebras -
17 -
Tevian -
Dray -
- -
Subalgebras -
of -
the -
Split -
Octonions -
- -
JMM2018 -
AMS -
Quaternion -
Special -
Session -
Bernard -
Leclerc, -
\"Representations -
of -
Borel -
subalgebras -
of -
quantum -
loop -
algebras\" -
Vasyl -
Chupordia, -
On -
Leibniz -
-
algebras -
with -
-
maximal -
-
cyclic -
-
subalgebras -
Teresa -
Conde: -
Medley -
on -
exact -
Borel -
subalgebras -
There -
Is -
No -
Odd -
Subalgebra -
Stone-Weierstrass: -
unital -
subalgebra -
and -
separation -
of -
points -
Stefaan -
Vaes -
- -
Classification -
of -
regular -
subalgebras -
of -
the -
hyperfinite -
II1 -
factor -
Leonid -
Rybnikov: -
Bethe -
subalgebras -
in -
Yangians -
and -
the -
wonderful -
compactification -
17.12.2019 -
C*-algebras -
6: -
The -
Gelfand -
Transform -
Group -
Theory -
L12V3: -
Generators -
of -
SO(n) -
and -
the -
Cartan -
Subalgebra -
Rolando -
de -
Santiago: -
\"L2 -
cohomology -
and -
maximal -
rigid -
subalgebras -
of -
s-malleable -
deformations\" -
