Dynkin index

In mathematics, the Dynkin index ${\displaystyle I(\lambda )}$ of finite-dimensional highest-weight representations of a compact simple Lie algebra ${\displaystyle 𝔤}$ relates their trace forms via

$${\displaystyle \frac{{\text{Tr}}_{V_{\lambda }}}{{\text{Tr}}_{V_{\mu }}}=\frac{I(\lambda )}{I(\mu )}.}$$

In the particular case where ${\displaystyle \lambda }$ is the highest root, so that ${\displaystyle V_{\lambda }}$ is the adjoint representation, the Dynkin index ${\displaystyle I(\lambda )}$ is equal to the dual Coxeter number.

The notation ${\displaystyle {\text{Tr}}_V}$ is the trace form on the representation ${\displaystyle \rho :𝔤\to \text{End}(V)}$. By Schur's lemma, since the trace forms are all invariant forms, they are related by constants, so the index is well-defined.

Since the trace forms are bilinear forms, we can take traces to obtainTemplate:Citation needed

${\displaystyle I(\lambda )=\frac{\dim V_{\lambda }}{2\dim 𝔤}(\lambda ,\lambda +2\rho )}$

where the Weyl vector

${\displaystyle \rho =\frac{1}{2}\sum _{\alpha \in {\mathrm{\Delta }}^{+}}\alpha }$

is equal to half of the sum of all the positive roots of ${\displaystyle 𝔤}$. The expression ${\displaystyle (\lambda ,\lambda +2\rho )}$ is the value of the quadratic Casimir in the representation ${\displaystyle V_{\lambda }}$.

• Killing form

• Philippe Di Francesco, Pierre Mathieu, David Sénéchal, Conformal Field Theory, 1997 Springer-Verlag New York, Template:Isbn