"Root system of affine Kac-Moody algebra"의 두 판 사이의 차이

introduction

• \(\Phi=\{\alpha+n\delta|\alpha\in\Phi^{0},n\in\mathbb{Z}\}\cup \{n\delta|n\in\mathbb{Z},n \neq 0\}\)
• real roots
  • \(\{\alpha+n\delta|\alpha\in\Phi^{0},n\in\mathbb{Z}\}\)
  • multiplicity 1 [Carter Cor14 .16 and Prop16 .18]
  • roots coming from the simple Lie algebra
• imaginary roots
  • \(\{n\delta|n\in\mathbb{Z},n \neq 0\}\)
  • has norm zero i.e. \(\delta^2=0\)
  • multiplicity is not always 1 but equal to the rank of the simple Lie algebra
• simple roots
  • \(\alpha_0,\alpha_1,\cdots,\alpha_r\)
• positive roots

\[\Phi^{+}=\{\alpha+n\delta|\alpha\in\Phi^{0},n>0\}\cup (\Phi^{0})^{+}\cup \{n\delta|n\in\mathbb{Z},n> 0\}\]

related items

• Affine weight lattice
• Shifted Weyl group action

computational resource

• https://drive.google.com/file/d/0B8XXo8Tve1cxbG9aNzhIc1ZSU0U/view