캐츠-무디 대수 (Kac-Moody algebra)

개요

\(A=(a_{ij})_{i,j\in I}\) GCM
\(P^{\vee}=(\bigoplus_{i\in I}\mathbb{Z}h_{i})\bigoplus(\bigoplus_{j=1}^{\operatorname{corank}(A)}\mathbb{Z}d_{j})\) : dual weight lattice
\(\mathfrak{h}=\mathbb{Q}\otimes_{\mathbb{Z}} P^{\vee}\) : Cartan subalgebra
\(P=\{\lambda\in\mathfrak{h}^{*}|\lambda(P^{\vee})\subset \mathbb{Z}\}\) : weight lattice
\(\Pi^{\vee}=\{h_{i}|i\in I\}\) : simple coroots
\(\Pi=\{\alpha_{i}\in\mathfrak{h}^{*}|i\in I, \alpha_{i}(h_j)=a_{ji}\}\) : simple roots

fundamental weights \(\{\Lambda_{i}\in\mathfrak{h}^{*}|i\in I, \Lambda_{i}(h_j)=\delta_{ij},\Lambda_{i}(d_j)=0\}\)
\(Q=\bigoplus_{i\in I}\mathbb{Z}\alpha_{i}\) : root lattice
Weyl group \(W=\langle r_{i}|i\in I\rangle\)

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