Type: \(\displaystyle A^{2}_1\) (Dynkin type computed to be: \(\displaystyle A^{2}_1\))
Simple basis: 1 vectors: (1, 1, 1)
Simple basis epsilon form:
Simple basis epsilon form with respect to k:
Number of outer autos with trivial action on orthogonal complement and extending to autos of ambient algebra: 0
Number of outer autos with trivial action on orthogonal complement: 0.
C(k_{ss})_{ss}: 2A^{1}_1
simple basis centralizer: 2 vectors: (0, 1, 2), (0, 1, 0)

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Number of k-submodules of g: 11
Module decomposition, fundamental coords over k: \(\displaystyle 5V_{2\omega_{1}}+6V_{0}\)
g/k k-submodules

id	size	b\cap k-lowest weight	b\cap k-highest weight	Module basis	Weights epsilon coords
Module 1	1	(0, -1, -2)	(0, -1, -2)	g_{-7}	-\varepsilon_{2}-\varepsilon_{3}
Module 2	1	(0, -1, 0)	(0, -1, 0)	g_{-2}	-\varepsilon_{2}+\varepsilon_{3}
Module 3	3	(-1, -2, -2)	(1, 0, 0)	g_{1} g_{-5} g_{-9}	\varepsilon_{1}-\varepsilon_{2} -\varepsilon_{2} -\varepsilon_{1}-\varepsilon_{2}
Module 4	1	(0, 1, 0)	(0, 1, 0)	g_{2}	\varepsilon_{2}-\varepsilon_{3}
Module 5	3	(-1, -1, -2)	(1, 1, 0)	g_{4} g_{-3} g_{-8}	\varepsilon_{1}-\varepsilon_{3} -\varepsilon_{3} -\varepsilon_{1}-\varepsilon_{3}
Module 6	3	(-1, -1, -1)	(1, 1, 1)	g_{6} h_{3}+h_{2}+h_{1} g_{-6}	\varepsilon_{1} 0 -\varepsilon_{1}
Module 7	1	(0, 1, 2)	(0, 1, 2)	g_{7}	\varepsilon_{2}+\varepsilon_{3}
Module 8	3	(-1, -1, 0)	(1, 1, 2)	g_{8} g_{3} g_{-4}	\varepsilon_{1}+\varepsilon_{3} \varepsilon_{3} -\varepsilon_{1}+\varepsilon_{3}
Module 9	3	(-1, 0, 0)	(1, 2, 2)	g_{9} g_{5} g_{-1}	\varepsilon_{1}+\varepsilon_{2} \varepsilon_{2} -\varepsilon_{1}+\varepsilon_{2}
Module 10	1	(0, 0, 0)	(0, 0, 0)	h_{2}	0
Module 11	1	(0, 0, 0)	(0, 0, 0)	h_{3}	0

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Information about the subalgebra generation algorithm.
Heirs rejected due to having symmetric Cartan type outside of list dictated by parabolic heirs: 5
Heirs rejected due to not being maximally dominant: 3
Heirs rejected due to not being maximal with respect to small Dynkin diagram automorphism that extends to ambient automorphism: 3
Heirs rejected due to having ambient Lie algebra decomposition iso to an already found subalgebra: 0
Parabolically induced by 0
Potential Dynkin type extensions: A^{2}_2, B^{2}_2, 2A^{2}_1, A^{2}_1+A^{1}_1,