Exceptional Lie algebra

In mathematics, an exceptional Lie algebra is a complex simple Lie algebra whose Dynkin diagram is of exceptional (nonclassical) type.^[1] There are exactly five of them: ${\mathfrak {g}}_{2},{\mathfrak {f}}_{4},{\mathfrak {e}}_{6},{\mathfrak {e}}_{7},{\mathfrak {e}}_{8}$ ; their respective dimensions are 14, 52, 78, 133, 248.^[2] The corresponding diagrams are:^[3]

G₂ :
F₄ :
E₆ :
E₇ :
E₈ :

In contrast, simple Lie algebras that are not exceptional are called classical Lie algebras (there are infinitely many of them).

Construction[edit]

There is no simple universally accepted way to construct exceptional Lie algebras; in fact, they were discovered only in the process of the classification program. Here are some constructions:

§ 22.1-2 of (Fulton & Harris 1991) give a detailed construction of ${\mathfrak {g}}_{2}$ .
Exceptional Lie algebras may be realized as the derivation algebras of appropriate nonassociative algebras.
Construct ${\mathfrak {e}}_{8}$ first and then find ${\mathfrak {e}}_{6},{\mathfrak {e}}_{7}$ as subalgebras.
Tits has given a uniformed construction of the five exceptional Lie algebras.^[4]

References[edit]

^ Fulton & Harris 1991, Theorem 9.26.
^ Knapp 2002, Appendix C, § 2.
^ Fulton & Harris 1991, § 21.2.
^ Tits, Jacques (1966). "Algèbres alternatives, algèbres de Jordan et algèbres de Lie exceptionnelles. I. Construction" (PDF). Indag. Math. 28: 223–237. Retrieved 9 August 2023.

Fulton, William; Harris, Joe (1991). Representation theory. A first course. Graduate Texts in Mathematics, Readings in Mathematics. Vol. 129. New York: Springer-Verlag. doi:10.1007/978-1-4612-0979-9. ISBN 978-0-387-97495-8. MR 1153249. OCLC 246650103.
Jacobson, N. (2017) [1971]. Exceptional Lie Algebras. CRC Press. ISBN 978-1-351-44938-0.
Knapp, Anthony W. (21 August 2002). Lie Groups Beyond an Introduction. Springer Science & Business Media. ISBN 978-0-8176-4259-4.

Construction[edit]

References[edit]

Further reading[edit]