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In [[group theory]], a discipline within mathematics, the '''structure constants''' of a [[Lie group]] determine the commutation relations between its generators in the associated [[Lie algebra]].  
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==Definition==
Given a set of generators <math>T^i</math>, the '''[[structure constants]]''' <math>f^{abc}</math>express the Lie brackets of pairs of generators as linear combinations of generators from the set, i.e.
 
:<math>[T^a, T^b] = f^{abc} T^c</math>.
 
The structure constants determine the Lie brackets of elements of the Lie algebra, and consequently nearly completely determine the group structure of the Lie group. For small elements <math>X, Y</math> of the Lie algebra, the structure of the Lie group near the identity element is given by <math>\exp(X)\exp(Y) \approx \exp(X + Y + \tfrac{1}{2}[X,Y])</math>. This expression is made exact by the [[Baker–Campbell–Hausdorff formula]].
 
 
== Examples ==
 
=== SU(2) ===
 
The generators of the group SU(2) satisfy the commutation relations (where <math>\epsilon^{abc}</math> is the [[Levi-Civita symbol]]):
 
: <math>[J^a, J^b] = i \epsilon^{abc} J^c \, </math>
 
In this case, <math>f^{abc} = i\epsilon^{abc}</math>, and the distinction between upper and lower indexes doesn't matter (the metric is the [[Kronecker delta]] <math>\delta_{ab}</math>).
 
=== SU(3) ===
 
A less trivial example is given by SU(3):
 
Its generators, ''T'', in the defining representation, are:
:<math>T^a = \frac{\lambda^a }{2}.\,</math>
where <math>\lambda \,</math>, the [[Gell-Mann matrices]], are the SU(3) analog of the [[Pauli matrices]] for SU(2):
 
:{| border="0" cellpadding="5" cellspacing="0"
|<math>\lambda^1 = \begin{pmatrix} 0 & 1 & 0 \\ 1 & 0 & 0 \\ 0 & 0 & 0 \end{pmatrix}</math>
|<math>\lambda^2 = \begin{pmatrix} 0 & -i & 0 \\ i & 0 & 0 \\ 0 & 0 & 0 \end{pmatrix}</math>
|<math>\lambda^3 = \begin{pmatrix} 1 & 0 & 0 \\ 0 & -1 & 0 \\ 0 & 0 & 0 \end{pmatrix}</math>
|-
|<math>\lambda^4 = \begin{pmatrix} 0 & 0 & 1 \\ 0 & 0 & 0 \\ 1 & 0 & 0 \end{pmatrix}</math>
|<math>\lambda^5 = \begin{pmatrix} 0 & 0 & -i \\ 0 & 0 & 0 \\ i & 0 & 0 \end{pmatrix}</math>
|<math>\lambda^6 = \begin{pmatrix} 0 & 0 & 0 \\ 0 & 0 & 1 \\ 0 & 1 & 0 \end{pmatrix}</math>
|-
|<math>\lambda^7 = \begin{pmatrix} 0 & 0 & 0 \\ 0 & 0 & -i \\ 0 & i & 0 \end{pmatrix}</math>
|<math>\lambda^8 = \frac{1}{\sqrt{3}} \begin{pmatrix} 1 & 0 & 0 \\ 0 & 1 & 0 \\ 0 & 0 & -2 \end{pmatrix}.</math>
|
|}
 
These obey the relations
:<math>\left[T^a, T^b \right] = i f^{abc} T^c \,</math>
:<math> \{T^a, T^b\} = \frac{1}{3}\delta^{ab} + d^{abc} T^c. \,</math>
The structure constants are given by:
:<math>f^{123} = 1 \,</math>
:<math>f^{147} = -f^{156} = f^{246} = f^{257} = f^{345} = -f^{367} = \frac{1}{2} \,</math>
:<math>f^{458} = f^{678} = \frac{\sqrt{3}}{2}, \,</math>
and all other <math>f^{abc}</math> not related to these by permutation are zero.
 
The ''d'' take the values:
:<math>d^{118} = d^{228} = d^{338} = -d^{888} = \frac{1}{\sqrt{3}} \,</math>
:<math>d^{448} = d^{558} = d^{668} = d^{778} = -\frac{1}{2\sqrt{3}} \,</math>
:<math>d^{146} = d^{157} = -d^{247} = d^{256} = d^{344} = d^{355} = -d^{366} = -d^{377} = \frac{1}{2}. \,</math>
 
===Hall polynomials===
The Hall polynomials are the structure constants of the [[Hall algebra]].
 
==Applications==
 
*A [[nilmanifold|nilpotent Lie group]] admits a lattice if and only if its Lie algebra admits a basis with rational [[structure constants]]: this is [[Malcev's criterion]].  Not all nilpotent Lie groups admit lattices; for more details, see also Raghunathan.<ref>Raghunathan, Chapter II, ''Discrete Subgroups of Lie Groups'', M. S. Raghunathan</ref>
*In [[quantum chromodynamics]], the symbol <math>G^a_{\mu \nu} \,</math> represents the gauge invariant [[gluon field strength tensor]], analogous to the [[electromagnetic tensor|electromagnetic field strength tensor]], ''F''<sup>μν</sup>, in [[quantum electrodynamics]]. It is given by:<ref>{{cite article|title=The field strength correlator from QCD sum rules
|author=M. Eidemüller, H.G. Dosch, M. Jamin
|year=1999
|publisher=
|location=Heidelberg, Germany
|journal=Nucl.Phys.Proc.Suppl.86:421-425,2000
|arxiv=hep-ph/9908318
|url=http://arxiv.org/pdf/hep-ph/9908318v1.pdf}}</ref>
 
::<math>G^a_{\mu \nu} = \partial_\mu \mathcal{A}^a_\nu - \partial_\nu \mathcal{A}^a_\mu + g f^{abc} \mathcal{A}^b_\mu \mathcal{A}^c_\nu \,,</math>
 
:where ''f<sub>abc</sub>'' are the [[structure constants]] of '''SU'''(3). Note that the rules to move-up or pull-down the ''a'', ''b'', or ''c'' indexes are ''trivial'', (+,... +), so that ''f<sup>abc</sup>'' = ''f<sub>abc</sub>'' = ''f''{{su|b=''bc''|p=''a''}} whereas for the ''μ'' or ''ν'' indexes one has the non-trivial ''relativistic'' rules, corresponding e.g. to the [[metric signature]] (+ − − −).
 
== References ==
{{reflist}}
* [[Steven Weinberg|Weinberg, Steven]], ''The Quantum Theory of Fields, Volume 1: Foundations'', Cambridge University Press, Cambridge, (1995). ISBN 0-521-55001-7.
 
[[Category:Lie algebras]]

Revision as of 15:07, 26 February 2013

In group theory, a discipline within mathematics, the structure constants of a Lie group determine the commutation relations between its generators in the associated Lie algebra.

Definition

Given a set of generators Ti, the structure constants fabcexpress the Lie brackets of pairs of generators as linear combinations of generators from the set, i.e.

[Ta,Tb]=fabcTc.

The structure constants determine the Lie brackets of elements of the Lie algebra, and consequently nearly completely determine the group structure of the Lie group. For small elements X,Y of the Lie algebra, the structure of the Lie group near the identity element is given by exp(X)exp(Y)exp(X+Y+12[X,Y]). This expression is made exact by the Baker–Campbell–Hausdorff formula.


Examples

SU(2)

The generators of the group SU(2) satisfy the commutation relations (where ϵabc is the Levi-Civita symbol):

[Ja,Jb]=iϵabcJc

In this case, fabc=iϵabc, and the distinction between upper and lower indexes doesn't matter (the metric is the Kronecker delta δab).

SU(3)

A less trivial example is given by SU(3):

Its generators, T, in the defining representation, are:

Ta=λa2.

where λ, the Gell-Mann matrices, are the SU(3) analog of the Pauli matrices for SU(2):

λ1=(010100000) λ2=(0i0i00000) λ3=(100010000)
λ4=(001000100) λ5=(00i000i00) λ6=(000001010)
λ7=(00000i0i0) λ8=13(100010002).

These obey the relations

[Ta,Tb]=ifabcTc
{Ta,Tb}=13δab+dabcTc.

The structure constants are given by:

f123=1
f147=f156=f246=f257=f345=f367=12
f458=f678=32,

and all other fabc not related to these by permutation are zero.

The d take the values:

d118=d228=d338=d888=13
d448=d558=d668=d778=123
d146=d157=d247=d256=d344=d355=d366=d377=12.

Hall polynomials

The Hall polynomials are the structure constants of the Hall algebra.

Applications

Gμνa=μ𝒜νaν𝒜μa+gfabc𝒜μb𝒜νc,
where fabc are the structure constants of SU(3). Note that the rules to move-up or pull-down the a, b, or c indexes are trivial, (+,... +), so that fabc = fabc = fTemplate:Su whereas for the μ or ν indexes one has the non-trivial relativistic rules, corresponding e.g. to the metric signature (+ − − −).

References

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  • Weinberg, Steven, The Quantum Theory of Fields, Volume 1: Foundations, Cambridge University Press, Cambridge, (1995). ISBN 0-521-55001-7.
  1. Raghunathan, Chapter II, Discrete Subgroups of Lie Groups, M. S. Raghunathan
  2. Template:Cite article