Jacobson–Morozov theorem

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In mathematics, the Jacobson–Morozov theorem is the assertion that nilpotent elements in a semi-simple Lie algebra can be extended to sl2-triples. The theorem is named after Jacobson 1951, Morozov 1942.

Statement

The statement of Jacobson–Morozov relies on the following preliminary notions: an sl2-triple in a semi-simple Lie algebra [math]\displaystyle{ \mathfrak g }[/math] (throughout in this article, over a field of characteristic zero) is a homomorphism of Lie algebras [math]\displaystyle{ \mathfrak{sl}_2 \to \mathfrak g }[/math]. Equivalently, it is a triple [math]\displaystyle{ e, f, h }[/math] of elements in [math]\displaystyle{ \mathfrak g }[/math] satisfying the relations

[math]\displaystyle{ [h,e] = 2e, \quad [h,f] = -2f, \quad [e,f] = h. }[/math]

An element [math]\displaystyle{ x \in \mathfrak g }[/math] is called nilpotent, if the endomorphism [math]\displaystyle{ [x, -] : \mathfrak g \to \mathfrak g }[/math] (known as the adjoint representation) is a nilpotent endomorphism. It is an elementary fact that for any sl2-triple [math]\displaystyle{ (e, f, h) }[/math], e must be nilpotent. The Jacobson–Morozov theorem states that, conversely, any nilpotent non-zero element [math]\displaystyle{ e \in \mathfrak g }[/math] can be extended to an sl2-triple.[1][2] For [math]\displaystyle{ \mathfrak g = \mathfrak{sl}_n }[/math], the sl2-triples obtained in this way are made explicit in (Chriss Ginzburg).

The theorem can also be stated for linear algebraic groups (again over a field k of characteristic zero): any morphism (of algebraic groups) from the additive group [math]\displaystyle{ G_a }[/math] to a reductive group H factors through the embedding

[math]\displaystyle{ G_a \to SL_2, x \mapsto \left ( \begin{array}{cc} 1 & x \\ 0 & 1 \end{array} \right ). }[/math]

Furthermore, any two such factorizations

[math]\displaystyle{ SL_2 \to H }[/math]

are conjugate by a k-point of H.

Generalization

A far-reaching generalization of the theorem as formulated above can be stated as follows: the inclusion of pro-reductive groups into all linear algebraic groups, where morphisms [math]\displaystyle{ G \to H }[/math] in both categories are taken up to conjugation by elements in [math]\displaystyle{ H(k) }[/math], admits a left adjoint, the so-called pro-reductive envelope. This left adjoint sends the additive group [math]\displaystyle{ G_a }[/math] to [math]\displaystyle{ SL_2 }[/math] (which happens to be semi-simple, as opposed to pro-reductive), thereby recovering the above form of Jacobson–Morozov. This generalized Jacobson–Morozov theorem was proven by (André Kahn) by appealing to methods related to Tannakian categories and by (O'Sullivan 2010) by more geometric methods.

References

  1. (Bourbaki 2007)
  2. (Jacobson 1979)
  • André, Yves; Kahn, Bruno (2002), "Nilpotence, radicaux et structures monoïdales", Rend. Semin. Mat. Univ. Padova 108: 107–291, Bibcode2002math......3273A 
  • Chriss, Neil; Ginzburg, Victor (1997), Representation theory and complex geometry, Birkhäuser, ISBN 0-8176-3792-3 
  • Bourbaki, Nicolas (2007), Groupes et algèbres de Lie: Chapitres 7 et 8, Springer, ISBN 9783540339779 
  • Jacobson, Nathan (1935), "Rational methods in the theory of Lie algebras", Annals of Mathematics, Second Series 36 (4): 875–881, doi:10.2307/1968593 
  • Jacobson, Nathan (1951), "Completely reducible Lie algebras of linear transformations", Proceedings of the American Mathematical Society 2: 105–113, doi:10.1090/S0002-9939-1951-0049882-5 
  • Jacobson, Nathan (1979), Lie algebras (Republication of the 1962 original ed.), Dover Publications, Inc., New York, ISBN 0-486-63832-4 
  • Morozov, V. V. (1942), "On a nilpotent element in a semi-simple Lie algebra", C. R. (Doklady) Acad. Sci. URSS, New Series 36: 83–86 
  • O'Sullivan, Peter (2010), "The generalised Jacobson-Morosov theorem", Memoirs of the American Mathematical Society 207 (973), doi:10.1090/s0065-9266-10-00603-4, ISBN 978-0-8218-4895-1