Difference between revisions of "Complexification of a Lie algebra"
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| − | The complex Lie algebra | + | The ''complexification of a Lie algebra |
| + | $\def\fg{ {\mathfrak g}}\fg$ over $\R$'' | ||
| + | is a complex Lie algebra $\fg_\C$ that is the | ||
| + | [[Tensor product|tensor product]] of the algebra $\fg$ with the complex field $\C$ over the field of real numbers $\R$: | ||
| − | + | $$\fg_\C=\fg\otimes_\R \C.$$ | |
| + | Thus, the complexification of the Lie algebra $\fg$ is obtained from $\fg$ by extending the field of scalars from $\R$ to $\C$. As elements of the algebra $\fg_\C$ one can consider pairs $(u,v)$, $u,v\in\fg$; the operations in $\fg_\C$ are then defined by the formulas: | ||
| − | + | $$(u_1,v_1)+(u_2,v_2)=(u_1+u_2,v_1+v_2),$$ | |
| − | + | $$\def\a{\alpha}\a+i\def\b{\beta}\b = (\a u - \b v,\a v + \b u)\ \textrm{ for any } \a,\b\in \R,$$ | |
| − | + | $$[(u_1,v_1),(u_2,v_2)] = [u_1,u_2] - [v_1,v_2].[v_1,u_2]+[u_1,v_2]).$$ | |
| + | The algebra $\fg_\C$ is also called the complex hull of the Lie algebra $\fg$. | ||
| − | + | Certain important properties of an algebra are preserved under complexification: $\fg_\C$ is nilpotent, solvable or semi-simple if and only if $\fg$ has this property. However, simplicity of $\fg$ does not, in general, imply that of $\fg_\C$. | |
| − | + | The notion of the complexification of a Lie algebra is closely related to that of a real form of a complex Lie algebra (cf. | |
| − | + | [[Form of an (algebraic) structure|Form of an (algebraic) structure]]). A real Lie subalgebra $\def\ff{ {\mathfrak f}}\ff$ of a complex Lie algebra $\def\fh{ {\mathfrak h}}\fh$ is called a real form of $\fh$ if each element $x\in\fh$ is uniquely representable in the form $x=u+iv$, where $u,v\in\ff$. The complexification of $\ff$ is naturally isomorphic to $\fh$. Not every complex Lie algebra has a real form. On the other hand, a given complex Lie algebra may, in general, have several non-isomorphic real forms. Thus, the Lie algebra of all real matrices of order $n$ and the Lie algebra of all anti-Hermitian matrices of order $n$ are non-isomorphic real forms of the Lie algebra of all complex matrices of order $n$ (which also has other real forms). | |
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| − | |||
| − | The notion of the complexification of a Lie algebra is closely related to that of a real form of a complex Lie algebra (cf. [[Form of an (algebraic) structure|Form of an (algebraic) structure]]). A real Lie subalgebra | ||
====References==== | ====References==== | ||
| − | + | {| | |
| + | |- | ||
| + | |valign="top"|{{Ref|Ga}}||valign="top"| F. Gantmakher, "On the classification of real simple Lie groups" ''Mat. Sb.'', '''5''' : 2 (1939) pp. 217–250 | ||
| + | |- | ||
| + | |valign="top"|{{Ref|Na}}||valign="top"| M.A. Naimark, "Theory of | ||
| + | group representations", Springer (1982) (Translated from Russian) | ||
| + | {{MR|0793377}} {{ZBL|0484.22018}} | ||
| + | |- | ||
| + | |valign="top"|{{Ref|Zh}}||valign="top"| D.P. Zhelobenko, "Compact Lie groups and their representations", Amer. Math. Soc. (1973) (Translated from Russian) {{MR|0473097}} {{MR|0473098}} {{ZBL|0228.22013}} | ||
| + | |- | ||
| + | |} | ||
Latest revision as of 17:08, 22 November 2013
2020 Mathematics Subject Classification: Primary: 17B [MSN][ZBL]
The complexification of a Lie algebra $\def\fg{ {\mathfrak g}}\fg$ over $\R$ is a complex Lie algebra $\fg_\C$ that is the tensor product of the algebra $\fg$ with the complex field $\C$ over the field of real numbers $\R$:
$$\fg_\C=\fg\otimes_\R \C.$$ Thus, the complexification of the Lie algebra $\fg$ is obtained from $\fg$ by extending the field of scalars from $\R$ to $\C$. As elements of the algebra $\fg_\C$ one can consider pairs $(u,v)$, $u,v\in\fg$; the operations in $\fg_\C$ are then defined by the formulas:
$$(u_1,v_1)+(u_2,v_2)=(u_1+u_2,v_1+v_2),$$
$$\def\a{\alpha}\a+i\def\b{\beta}\b = (\a u - \b v,\a v + \b u)\ \textrm{ for any } \a,\b\in \R,$$
$$[(u_1,v_1),(u_2,v_2)] = [u_1,u_2] - [v_1,v_2].[v_1,u_2]+[u_1,v_2]).$$ The algebra $\fg_\C$ is also called the complex hull of the Lie algebra $\fg$.
Certain important properties of an algebra are preserved under complexification: $\fg_\C$ is nilpotent, solvable or semi-simple if and only if $\fg$ has this property. However, simplicity of $\fg$ does not, in general, imply that of $\fg_\C$.
The notion of the complexification of a Lie algebra is closely related to that of a real form of a complex Lie algebra (cf. Form of an (algebraic) structure). A real Lie subalgebra $\def\ff{ {\mathfrak f}}\ff$ of a complex Lie algebra $\def\fh{ {\mathfrak h}}\fh$ is called a real form of $\fh$ if each element $x\in\fh$ is uniquely representable in the form $x=u+iv$, where $u,v\in\ff$. The complexification of $\ff$ is naturally isomorphic to $\fh$. Not every complex Lie algebra has a real form. On the other hand, a given complex Lie algebra may, in general, have several non-isomorphic real forms. Thus, the Lie algebra of all real matrices of order $n$ and the Lie algebra of all anti-Hermitian matrices of order $n$ are non-isomorphic real forms of the Lie algebra of all complex matrices of order $n$ (which also has other real forms).
References
| [Ga] | F. Gantmakher, "On the classification of real simple Lie groups" Mat. Sb., 5 : 2 (1939) pp. 217–250 |
| [Na] | M.A. Naimark, "Theory of
group representations", Springer (1982) (Translated from Russian) MR0793377 Zbl 0484.22018 |
| [Zh] | D.P. Zhelobenko, "Compact Lie groups and their representations", Amer. Math. Soc. (1973) (Translated from Russian) MR0473097 MR0473098 Zbl 0228.22013 |
How to Cite This Entry:
Complexification of a Lie algebra. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Complexification_of_a_Lie_algebra&oldid=12632
Complexification of a Lie algebra. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Complexification_of_a_Lie_algebra&oldid=12632
This article was adapted from an original article by V.L. Popov (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article