Difference between revisions of "Rank of an algebraic group"
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− | The dimension of a [[Cartan subgroup|Cartan subgroup]] of it (this dimension does not depend on the choice of the Cartan subgroup). Along with the rank of an algebraic group | + | {{TEX|done}} |
+ | The dimension of a [[Cartan subgroup|Cartan subgroup]] of it (this dimension does not depend on the choice of the Cartan subgroup). Along with the rank of an algebraic group $ G $ | ||
+ | one considers its semi-simple rank and reductive rank, which, by definition, are equal to the rank of the algebraic group $ G / R $ | ||
+ | and the rank of the algebraic group $ G / R _{u} $ | ||
+ | respectively, where $ R $ | ||
+ | is the radical of the algebraic group $ G $ | ||
+ | and $ R _{u} $ | ||
+ | is its unipotent radical (cf. [[Radical of a group|Radical of a group]]; [[Unipotent element|Unipotent element]]). The reductive rank of an algebraic group $ G $ | ||
+ | is equal to the dimension of any of its maximal tori (cf. [[Maximal torus|Maximal torus]]). The reductive $ k $ - | ||
+ | rank of a [[Linear algebraic group|linear algebraic group]] $ G $ | ||
+ | defined over a field $ k $ ( | ||
+ | and in the case when the group $ G $ | ||
+ | is reductive (cf. [[Reductive group|Reductive group]]) — simply its $ k $ - | ||
+ | rank) is the dimension of a maximal $ k $ - | ||
+ | split torus of it (this dimension does not depend on the choice of a torus; see [[Split group|Split group]]). If the $ k $ - | ||
+ | rank of a reductive linear algebraic group $ G $ | ||
+ | over $ k $ | ||
+ | is zero (is equal to the rank of $ G $ ), | ||
+ | then the group $ G $ | ||
+ | is said to be anisotropic (or split, respectively) over $ k $ ( | ||
+ | see also [[Anisotropic group|Anisotropic group]]). | ||
===Examples.=== | ===Examples.=== | ||
− | 1) The rank of the algebraic group | + | 1) The rank of the algebraic group $ T _{n} $ |
+ | of all non-singular upper-triangular square matrices of order $ n $ | ||
+ | is equal to its reductive rank and equal to $ n $ ; | ||
+ | the semi-simple rank of $ T _{n} $ | ||
+ | is zero. | ||
− | 2) The rank of the algebraic group | + | 2) The rank of the algebraic group $ U _{n} $ |
+ | of all upper-triangular square matrices of order $ n $ | ||
+ | with 1 on the principal diagonal is equal to its dimension $ n ( n - 1 ) / 2 $ , | ||
+ | and the reductive and semi-simple ranks of $ U _{n} $ | ||
+ | are zero. | ||
− | 3) The rank of the algebraic group | + | 3) The rank of the algebraic group $ O _{n} ( k ,\ f \ ) $ |
+ | of all $ k $ - | ||
+ | automorphisms of a definite [[Quadratic form|quadratic form]] $ f $ | ||
+ | on an $ n $ - | ||
+ | dimensional vector space over a field $ k $ | ||
+ | is equal to $ [ n / 2 ] $ , | ||
+ | and the $ k $ - | ||
+ | rank of the group $ O _{n} ( k ,\ f \ ) $ | ||
+ | is equal to the Witt index of the form $ f $ . | ||
+ | |||
+ | |||
+ | If the characteristic of the ground field is 0, then the rank of the algebraic group $ G $ | ||
+ | coincides with the rank of its Lie algebra $ L $ ( | ||
+ | see [[Rank of a Lie algebra|Rank of a Lie algebra]]) and is equal to the minimum multiplicity of the eigen value $ \lambda = 1 $ | ||
+ | of all possible adjoint operators $ \mathop{\rm Ad}\nolimits _{L} \ g $ ( | ||
+ | the minimum is taken over all $ g \in G $ ). | ||
+ | An element $ g \in G $ | ||
+ | for which this multiplicity is equal to the rank of the algebraic group $ G $ | ||
+ | is called regular. The set of regular elements of $ G $ | ||
+ | is open in the [[Zariski topology|Zariski topology]] on $ G $ . | ||
− | |||
====References==== | ====References==== | ||
<table><TR><TD valign="top">[1]</TD> <TD valign="top"> C. Chevalley, "Théorie des groupes de Lie" , '''2–3''' , Hermann (1952–1955) {{MR|0068552}} {{MR|0051242}} {{MR|0019623}} {{ZBL|0186.33104}} {{ZBL|0054.01303}} {{ZBL|0063.00843}} </TD></TR><TR><TD valign="top">[2]</TD> <TD valign="top"> A. Borel, J. Tits, "Groupes réductifs" ''Publ. Math. IHES'' , '''27''' (1965) pp. 55–250 {{MR|0207712}} {{ZBL|0145.17402}} </TD></TR><TR><TD valign="top">[3]</TD> <TD valign="top"> A. Borel, "Linear algebraic groups" , Benjamin (1969) {{MR|0251042}} {{ZBL|0206.49801}} {{ZBL|0186.33201}} </TD></TR><TR><TD valign="top">[4]</TD> <TD valign="top"> J.E. Humphreys, "Linear algebraic groups" , Springer (1975) {{MR|0396773}} {{ZBL|0325.20039}} </TD></TR></table> | <table><TR><TD valign="top">[1]</TD> <TD valign="top"> C. Chevalley, "Théorie des groupes de Lie" , '''2–3''' , Hermann (1952–1955) {{MR|0068552}} {{MR|0051242}} {{MR|0019623}} {{ZBL|0186.33104}} {{ZBL|0054.01303}} {{ZBL|0063.00843}} </TD></TR><TR><TD valign="top">[2]</TD> <TD valign="top"> A. Borel, J. Tits, "Groupes réductifs" ''Publ. Math. IHES'' , '''27''' (1965) pp. 55–250 {{MR|0207712}} {{ZBL|0145.17402}} </TD></TR><TR><TD valign="top">[3]</TD> <TD valign="top"> A. Borel, "Linear algebraic groups" , Benjamin (1969) {{MR|0251042}} {{ZBL|0206.49801}} {{ZBL|0186.33201}} </TD></TR><TR><TD valign="top">[4]</TD> <TD valign="top"> J.E. Humphreys, "Linear algebraic groups" , Springer (1975) {{MR|0396773}} {{ZBL|0325.20039}} </TD></TR></table> |
Latest revision as of 15:02, 17 December 2019
The dimension of a Cartan subgroup of it (this dimension does not depend on the choice of the Cartan subgroup). Along with the rank of an algebraic group $ G $ one considers its semi-simple rank and reductive rank, which, by definition, are equal to the rank of the algebraic group $ G / R $ and the rank of the algebraic group $ G / R _{u} $ respectively, where $ R $ is the radical of the algebraic group $ G $ and $ R _{u} $ is its unipotent radical (cf. Radical of a group; Unipotent element). The reductive rank of an algebraic group $ G $ is equal to the dimension of any of its maximal tori (cf. Maximal torus). The reductive $ k $ - rank of a linear algebraic group $ G $ defined over a field $ k $ ( and in the case when the group $ G $ is reductive (cf. Reductive group) — simply its $ k $ - rank) is the dimension of a maximal $ k $ - split torus of it (this dimension does not depend on the choice of a torus; see Split group). If the $ k $ - rank of a reductive linear algebraic group $ G $ over $ k $ is zero (is equal to the rank of $ G $ ), then the group $ G $ is said to be anisotropic (or split, respectively) over $ k $ ( see also Anisotropic group).
Examples.
1) The rank of the algebraic group $ T _{n} $ of all non-singular upper-triangular square matrices of order $ n $ is equal to its reductive rank and equal to $ n $ ; the semi-simple rank of $ T _{n} $ is zero.
2) The rank of the algebraic group $ U _{n} $ of all upper-triangular square matrices of order $ n $ with 1 on the principal diagonal is equal to its dimension $ n ( n - 1 ) / 2 $ , and the reductive and semi-simple ranks of $ U _{n} $ are zero.
3) The rank of the algebraic group $ O _{n} ( k ,\ f \ ) $ of all $ k $ - automorphisms of a definite quadratic form $ f $ on an $ n $ - dimensional vector space over a field $ k $ is equal to $ [ n / 2 ] $ , and the $ k $ - rank of the group $ O _{n} ( k ,\ f \ ) $ is equal to the Witt index of the form $ f $ .
If the characteristic of the ground field is 0, then the rank of the algebraic group $ G $
coincides with the rank of its Lie algebra $ L $ (
see Rank of a Lie algebra) and is equal to the minimum multiplicity of the eigen value $ \lambda = 1 $
of all possible adjoint operators $ \mathop{\rm Ad}\nolimits _{L} \ g $ (
the minimum is taken over all $ g \in G $ ).
An element $ g \in G $
for which this multiplicity is equal to the rank of the algebraic group $ G $
is called regular. The set of regular elements of $ G $
is open in the Zariski topology on $ G $ .
References
[1] | C. Chevalley, "Théorie des groupes de Lie" , 2–3 , Hermann (1952–1955) MR0068552 MR0051242 MR0019623 Zbl 0186.33104 Zbl 0054.01303 Zbl 0063.00843 |
[2] | A. Borel, J. Tits, "Groupes réductifs" Publ. Math. IHES , 27 (1965) pp. 55–250 MR0207712 Zbl 0145.17402 |
[3] | A. Borel, "Linear algebraic groups" , Benjamin (1969) MR0251042 Zbl 0206.49801 Zbl 0186.33201 |
[4] | J.E. Humphreys, "Linear algebraic groups" , Springer (1975) MR0396773 Zbl 0325.20039 |
Rank of an algebraic group. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Rank_of_an_algebraic_group&oldid=44282