Difference between revisions of "Semi-simple element"
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| − | ''of a linear algebraic group | + | {{TEX|done}} |
| + | ''of a linear algebraic group $ G $ '' | ||
| − | |||
| − | Analogously one defines semi-simple elements of the algebraic Lie algebra | + | An element $ g \in G \subset \mathop{\rm GL}\nolimits (V) $ , |
| + | where $ V $ | ||
| + | is a finite-dimensional vector space over an algebraically closed field $ K $ , | ||
| + | which is a [[Semi-simple endomorphism|semi-simple endomorphism]] of the space $ V $ , | ||
| + | i.e. is diagonalizable. The notion of a semi-simple element of $ G $ | ||
| + | is intrinsic, i.e. is determined by the algebraic group structure of $ G $ | ||
| + | only and does not depend on the choice of a faithful representation $ G \subset \mathop{\rm GL}\nolimits (V) $ | ||
| + | as a closed algebraic subgroup of a general linear group. An element $ g \in G $ | ||
| + | is semi-simple if and only if the right translation operator $ \rho _{g} $ | ||
| + | in $ K [G] $ | ||
| + | is diagonalizable. For any rational [[Linear representation|linear representation]] $ \phi : \ G \rightarrow \mathop{\rm GL}\nolimits (W) $ , | ||
| + | the set of semi-simple elements of the group $ G $ | ||
| + | is mapped onto the set of semi-simple elements of the group $ \phi (G) $ . | ||
| + | |||
| + | |||
| + | Analogously one defines semi-simple elements of the algebraic Lie algebra $ \mathfrak g $ | ||
| + | of $ G $ ; | ||
| + | the differential $ d \phi : \ g \rightarrow \mathfrak g \mathfrak l (W) $ | ||
| + | of the representation $ \phi $ | ||
| + | maps the set of semi-simple elements of the algebra $ \mathfrak g $ | ||
| + | onto the set of semi-simple elements of its image. | ||
| + | |||
| + | By definition, a semi-simple element of an abstract Lie algebra $ \mathfrak g $ | ||
| + | is an element $ X \in \mathfrak g $ | ||
| + | for which the adjoint linear transformation $ \mathop{\rm ad}\nolimits \ X $ | ||
| + | is a semi-simple endomorphism of the vector space $ \mathfrak g $ . | ||
| + | If $ \mathfrak g \subset \mathfrak g \mathfrak l (V) $ | ||
| + | is the Lie algebra of a reductive linear algebraic group, then $ X $ | ||
| + | is a semi-simple element of the algebra $ \mathfrak g $ | ||
| + | if and only if $ X $ | ||
| + | is a semi-simple endomorphism of $ V $ . | ||
| − | |||
====References==== | ====References==== | ||
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====Comments==== | ====Comments==== | ||
| − | Thus, the notions of a semi-simple element for an algebraic Lie algebra (the Lie algebra of a linear algebraic group) and for an abstract Lie algebra do not necessarily coincide. But they do so for the Lie algebras of reductive linear algebraic groups (and semi-simple Lie algebras). To avoid this confusion, an element | + | Thus, the notions of a semi-simple element for an algebraic Lie algebra (the Lie algebra of a linear algebraic group) and for an abstract Lie algebra do not necessarily coincide. But they do so for the Lie algebras of reductive linear algebraic groups (and semi-simple Lie algebras). To avoid this confusion, an element $ X $ |
| + | of an abstract Lie algebra $ L $ | ||
| + | such that ad $ X $ | ||
| + | is a semi-simple endomorphism of $ L $ | ||
| + | is sometimes called $ \mathop{\rm ad}\nolimits $ - | ||
| + | semi-simple. | ||
Cf. also [[Jordan decomposition|Jordan decomposition]], 2). | Cf. also [[Jordan decomposition|Jordan decomposition]], 2). | ||
Latest revision as of 16:35, 17 December 2019
of a linear algebraic group $ G $
An element $ g \in G \subset \mathop{\rm GL}\nolimits (V) $ ,
where $ V $
is a finite-dimensional vector space over an algebraically closed field $ K $ ,
which is a semi-simple endomorphism of the space $ V $ ,
i.e. is diagonalizable. The notion of a semi-simple element of $ G $
is intrinsic, i.e. is determined by the algebraic group structure of $ G $
only and does not depend on the choice of a faithful representation $ G \subset \mathop{\rm GL}\nolimits (V) $
as a closed algebraic subgroup of a general linear group. An element $ g \in G $
is semi-simple if and only if the right translation operator $ \rho _{g} $
in $ K [G] $
is diagonalizable. For any rational linear representation $ \phi : \ G \rightarrow \mathop{\rm GL}\nolimits (W) $ ,
the set of semi-simple elements of the group $ G $
is mapped onto the set of semi-simple elements of the group $ \phi (G) $ .
Analogously one defines semi-simple elements of the algebraic Lie algebra $ \mathfrak g $
of $ G $ ;
the differential $ d \phi : \ g \rightarrow \mathfrak g \mathfrak l (W) $
of the representation $ \phi $
maps the set of semi-simple elements of the algebra $ \mathfrak g $
onto the set of semi-simple elements of its image.
By definition, a semi-simple element of an abstract Lie algebra $ \mathfrak g $ is an element $ X \in \mathfrak g $ for which the adjoint linear transformation $ \mathop{\rm ad}\nolimits \ X $ is a semi-simple endomorphism of the vector space $ \mathfrak g $ . If $ \mathfrak g \subset \mathfrak g \mathfrak l (V) $ is the Lie algebra of a reductive linear algebraic group, then $ X $ is a semi-simple element of the algebra $ \mathfrak g $ if and only if $ X $ is a semi-simple endomorphism of $ V $ .
References
| [1] | A. Borel, "Linear algebraic groups" , Benjamin (1969) MR0251042 Zbl 0206.49801 Zbl 0186.33201 |
| [2] | Yu.I. Merzlyakov, "Rational groups" , Moscow (1980) (In Russian) MR0602700 Zbl 0518.20032 |
| [3] | J.E. Humphreys, "Linear algebraic groups" , Springer (1975) MR0396773 Zbl 0325.20039 |
Comments
Thus, the notions of a semi-simple element for an algebraic Lie algebra (the Lie algebra of a linear algebraic group) and for an abstract Lie algebra do not necessarily coincide. But they do so for the Lie algebras of reductive linear algebraic groups (and semi-simple Lie algebras). To avoid this confusion, an element $ X $ of an abstract Lie algebra $ L $ such that ad $ X $ is a semi-simple endomorphism of $ L $ is sometimes called $ \mathop{\rm ad}\nolimits $ - semi-simple.
Cf. also Jordan decomposition, 2).
References
| [a1] | J.E. Humphreys, "Introduction to Lie algebras and representation theory" , Springer (1972) pp. §5.4 MR0323842 Zbl 0254.17004 |
| [a2] | J.-P. Serre, "Lie algebras and Lie groups" , Benjamin (1965) pp. LA6.14 (Translated from French) MR0218496 Zbl 0132.27803 |
Semi-simple element. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Semi-simple_element&oldid=21934