Difference between revisions of "Semi-simple algebraic group"
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| − | A connected linear algebraic group | + | A semi-simple group is a connected |
| + | [[Linear algebraic group|linear algebraic group]] of positive | ||
| + | dimension which contains only trivial solvable (or, equivalently, | ||
| + | Abelian) connected closed normal subgroups. The quotient group of a | ||
| + | connected non-solvable linear group by its radical is semi-simple. | ||
| − | + | A connected linear algebraic group $G$ of positive dimension is called | |
| + | simple (or quasi-simple) if it does not contain proper connected | ||
| + | closed normal subgroups. The centre $\def\Z{\mathrm{Z}}\Z(G)$ of a simple group $G$ is | ||
| + | finite, and $G/\Z(G)$ is simple as an abstract group. An algebraic group $G$ | ||
| + | is semi-simple if and only if $G$ is a product of simple connected | ||
| + | closed normal subgroups. | ||
| − | + | If the ground field is the field $\C$ of complex numbers, a semi-simple | |
| + | algebraic group is nothing but a semi-simple Lie group over $\C$ (cf. | ||
| + | [[Lie group, semi-simple|Lie group, semi-simple]]). It turns out that | ||
| + | the classification of semi-simple algebraic groups over an arbitrary | ||
| + | algebraically closed field $K$ is analogous to the case $K=\C$, that is, | ||
| + | a semi-simple algebraic group is determined up to isomorphism by its | ||
| + | root system and a certain sublattice in the weight lattice that | ||
| + | contains all the roots. More precisely, let $T$ be a | ||
| + | [[Maximal torus|maximal torus]] in the semi-simple algebraic group $G$ | ||
| + | and let $X(T)$ be the character group of $T$, regarded as a lattice in | ||
| + | the space $E=X(T)\otimes\R$. For a rational | ||
| + | [[Linear representation|linear representation]] $\rho$ of $G$, the group | ||
| + | $\rho(T)$ is diagonalizable. Its eigenvalues, which are elements of $X(T)$, are | ||
| + | called the weights of the representation $\rho$. The non-zero weights of | ||
| + | the adjoint representation $\mathrm{Ad}$ are called the roots of $G$. It turns | ||
| + | out that the system $\Sigma\subset X(T)$ of all roots of $E$ is a | ||
| + | [[Root system|root system]] in the space $E$, and that the irreducible | ||
| + | components of the system $\Sigma$ are the root systems for the simple | ||
| + | closed normal subgroups of $G$. Furthermore, $Q(\Sigma)\subseteq X(T)\subseteq P(\Sigma)$, where $Q(\Sigma)$ is the | ||
| + | lattice spanned by all roots and $P(\Sigma) = \{\lambda\in E \;|\; | ||
| + | \alpha^*(\lambda) \in \mathbb{Z} \textrm{ for all } \alpha\in\Sigma\}$ is the weight lattice in the root | ||
| + | system $\Sigma$. In the case $K=\C$ the space $E$ can be naturally identified | ||
| + | with a real subspace $\def\t{\mathfrak{t}}\t_\R^* \subset \t^*$, where $\t$ is the Lie algebra of the torus | ||
| + | $T$, spanned by the differentials of all characters, while the | ||
| + | lattices in $\t$ dual to $Q(\Sigma)\subseteq X(T)\subseteq P(\Sigma)$ coincide (up to a factor $2\pi i$) with $\Gamma_1\supseteq \Gamma(G)\supseteq \Gamma_0$ | ||
| + | (see | ||
| + | [[Lie group, semi-simple|Lie group, semi-simple]]). | ||
| − | The isogenies (in particular, all automorphisms, cf. [[Isogeny|Isogeny]]) of a semi-simple algebraic group have also been classified. | + | The main classification theorem states that if $G'$ is another |
| + | semi-simple algebraic group, $T'$ its maximal torus, $\Sigma'\subset E'$ a root system | ||
| + | of $G'$, and if there is a linear mapping $E\to E'$ giving an isomorphism | ||
| + | between the root systems $\Sigma$ and $\Sigma'$ and mapping $X(T)$ onto $X(T')$, then | ||
| + | $G\cong G'$ (local isomorphism). Moreover, for any reduced root system $\Sigma$ and | ||
| + | any lattice $\Lambda$ satisfying the condition $Q(\Sigma)\subseteq \Lambda\subseteq P(\Sigma)$ there exists a | ||
| + | semi-simple algebraic group $G$ such that $\Sigma$ is its root system with | ||
| + | respect to the maximal torus $T$, and $\Lambda = X(T)$. | ||
| + | |||
| + | The isogenies (in particular, all automorphisms, cf. | ||
| + | [[Isogeny|Isogeny]]) of a semi-simple algebraic group have also been | ||
| + | classified. | ||
====References==== | ====References==== | ||
| − | <table><TR><TD valign="top">[1]</TD> <TD valign="top"> | + | <table><TR><TD valign="top">[1]</TD> |
| + | <TD valign="top"> R.G. Steinberg, "Lectures on Chevalley groups", Yale Univ. Press (1968) | {{MR|0466335}} | {{ZBL|1196.22001}}</TD> | ||
| + | </TR><TR><TD valign="top">[2]</TD> | ||
| + | <TD valign="top"> J.E. Humphreys, "Linear algebraic groups", Springer (1975) | {{MR|0396773}} | {{ZBL|0471.20029}}</TD> | ||
| + | </TR></table> | ||
| Line 18: | Line 68: | ||
====References==== | ====References==== | ||
| − | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> | + | <table><TR><TD valign="top">[a1]</TD> |
| + | <TD valign="top"> T.A. Springer, "Linear algebraic groups", Birkhäuser (1981) | {{MR|1642713}} | {{ZBL|0927.20024}}</TD> | ||
| + | </TR></table> | ||
Revision as of 13:24, 24 December 2011
2020 Mathematics Subject Classification: Primary: 20G15 Secondary: 14L10 [MSN][ZBL]
A semi-simple group is a connected linear algebraic group of positive dimension which contains only trivial solvable (or, equivalently, Abelian) connected closed normal subgroups. The quotient group of a connected non-solvable linear group by its radical is semi-simple.
A connected linear algebraic group $G$ of positive dimension is called simple (or quasi-simple) if it does not contain proper connected closed normal subgroups. The centre $\def\Z{\mathrm{Z}}\Z(G)$ of a simple group $G$ is finite, and $G/\Z(G)$ is simple as an abstract group. An algebraic group $G$ is semi-simple if and only if $G$ is a product of simple connected closed normal subgroups.
If the ground field is the field $\C$ of complex numbers, a semi-simple algebraic group is nothing but a semi-simple Lie group over $\C$ (cf. Lie group, semi-simple). It turns out that the classification of semi-simple algebraic groups over an arbitrary algebraically closed field $K$ is analogous to the case $K=\C$, that is, a semi-simple algebraic group is determined up to isomorphism by its root system and a certain sublattice in the weight lattice that contains all the roots. More precisely, let $T$ be a maximal torus in the semi-simple algebraic group $G$ and let $X(T)$ be the character group of $T$, regarded as a lattice in the space $E=X(T)\otimes\R$. For a rational linear representation $\rho$ of $G$, the group $\rho(T)$ is diagonalizable. Its eigenvalues, which are elements of $X(T)$, are called the weights of the representation $\rho$. The non-zero weights of the adjoint representation $\mathrm{Ad}$ are called the roots of $G$. It turns out that the system $\Sigma\subset X(T)$ of all roots of $E$ is a root system in the space $E$, and that the irreducible components of the system $\Sigma$ are the root systems for the simple closed normal subgroups of $G$. Furthermore, $Q(\Sigma)\subseteq X(T)\subseteq P(\Sigma)$, where $Q(\Sigma)$ is the lattice spanned by all roots and $P(\Sigma) = \{\lambda\in E \;|\; \alpha^*(\lambda) \in \mathbb{Z} \textrm{ for all } \alpha\in\Sigma\}$ is the weight lattice in the root system $\Sigma$. In the case $K=\C$ the space $E$ can be naturally identified with a real subspace $\def\t{\mathfrak{t}}\t_\R^* \subset \t^*$, where $\t$ is the Lie algebra of the torus $T$, spanned by the differentials of all characters, while the lattices in $\t$ dual to $Q(\Sigma)\subseteq X(T)\subseteq P(\Sigma)$ coincide (up to a factor $2\pi i$) with $\Gamma_1\supseteq \Gamma(G)\supseteq \Gamma_0$ (see Lie group, semi-simple).
The main classification theorem states that if $G'$ is another semi-simple algebraic group, $T'$ its maximal torus, $\Sigma'\subset E'$ a root system of $G'$, and if there is a linear mapping $E\to E'$ giving an isomorphism between the root systems $\Sigma$ and $\Sigma'$ and mapping $X(T)$ onto $X(T')$, then $G\cong G'$ (local isomorphism). Moreover, for any reduced root system $\Sigma$ and any lattice $\Lambda$ satisfying the condition $Q(\Sigma)\subseteq \Lambda\subseteq P(\Sigma)$ there exists a semi-simple algebraic group $G$ such that $\Sigma$ is its root system with respect to the maximal torus $T$, and $\Lambda = X(T)$.
The isogenies (in particular, all automorphisms, cf. Isogeny) of a semi-simple algebraic group have also been classified.
References
| [1] | R.G. Steinberg, "Lectures on Chevalley groups", Yale Univ. Press (1968) | MR0466335 | Zbl 1196.22001 |
| [2] | J.E. Humphreys, "Linear algebraic groups", Springer (1975) | MR0396773 | Zbl 0471.20029 |
Comments
References
| [a1] | T.A. Springer, "Linear algebraic groups", Birkhäuser (1981) | MR1642713 | Zbl 0927.20024 |
How to Cite This Entry:
Semi-simple algebraic group. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Semi-simple_algebraic_group&oldid=18012
Semi-simple algebraic group. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Semi-simple_algebraic_group&oldid=18012
This article was adapted from an original article by A.L. Onishchik (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article