Lever rule: Difference between revisions

Revision as of 15:06, 14 October 2013

In mathematics, the Dynkin index

x_{λ}

of a representation with highest weight $| λ |$ of a compact simple Lie algebra g that has a highest weight $λ$ is defined by

t r (t_{a} t_{b}) = 2 x_{λ} g_{a b}

evaluated in the representation $| λ |$ . Here $t_{a}$ are the matrices representing the generators, and $g_{a b}$ is

t r (t_{a} t_{b}) = 2 g_{a b}

evaluated in the defining representation.

By taking traces, we find that

x_{λ} = \frac{\dim (| λ |)}{2 \dim (g)} (λ, λ + 2 ρ)

where the Weyl vector

ρ = \frac{1}{2} \sum_{α \in Δ^{+}} α

is equal to half of the sum of all the positive roots of g. The expression $(λ, λ + 2 ρ)$ is the value quadratic Casimir in the representation $| λ |$ . The index $x_{λ}$ is always a positive integer.

In the particular case where $λ$ is the highest root, meaning that $| λ |$ is the adjoint representation, $x_{λ}$ is equal to the dual Coxeter number.

References

Philippe Di Francesco, Pierre Mathieu, David Sénéchal, Conformal Field Theory, 1997 Springer-Verlag New York, ISBN 0-387-94785-X

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+In [[mathematics]], the '''Dynkin index'''
+:<math>x_{\lambda}</math>
+of a representation with highest weight <math>|\lambda|</math> of a compact simple  [[Lie algebra]] ''g'' that has a [[highest weight]] <math>\lambda</math> is defined by
+:<math> {\rm tr}(t_at_b)= 2x_\lambda g_{ab}</math>
+evaluated in the representation <math>|\lambda|</math>. Here <math>t_a</math> are the matrices representing the generators, and
+<math>g_{ab}</math> is
+:<math> {\rm tr}(t_at_b)= 2g_{ab}</math>
+evaluated in  the defining representation.
+By taking traces, we find that
+:<math>x_{\lambda}=\frac{\dim(|\lambda|)}{2\dim(g)}(\lambda, \lambda +2\rho)</math>
+where the [[Weyl vector]]
+:<math>\rho=\frac{1}{2}\sum_{\alpha\in \Delta^+} \alpha</math>
+is equal to half of the sum of all the [[positive root]]s of ''g''.  The expression <math>(\lambda, \lambda +2\rho)</math> is the value quadratic Casimir  in the representation <math>|\lambda|</math>.  The index <math>x_{\lambda}</math> is always a positive integer.
+In the particular case where <math>\lambda</math> is the [[highest root]], meaning that <math>|\lambda|</math> is the [[Adjoint representation of a Lie group|adjoint representation]], <math>x_{\lambda}</math> is equal to the [[dual Coxeter number]].
+==References==
+* Philippe Di Francesco, Pierre Mathieu, David Sénéchal, ''Conformal Field Theory'', 1997 Springer-Verlag New York, ISBN 0-387-94785-X
+[[Category:Representation theory of Lie algebras]]

Lever rule: Difference between revisions

Revision as of 15:06, 14 October 2013

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