Theorem of the highest weight

In representation theory, a branch of mathematics, the theorem of the highest weight classifies the irreducible representations of a complex semisimple Lie algebra ${\mathfrak {g}}$ .^[1]^[2] There is a closely related theorem classifying the irreducible representations of a connected compact Lie group $K$ .^[3] The theorem states that there is a bijection

\lambda \mapsto [V^{\lambda }]

from the set of "dominant integral elements" to the set of equivalence classes of irreducible representations of ${\mathfrak {g}}$ or $K$ . The difference between the two results is in the precise notion of "integral" in the definition of a dominant integral element. If $K$ is simply connected, this distinction disappears.

The theorem was originally proved by Élie Cartan in his 1913 paper.^[4] The version of the theorem for a compact Lie group is due to Hermann Weyl. The theorem is one of the key pieces of representation theory of semisimple Lie algebras.

^ Dixmier 1996, Theorem 7.2.6.
^ Hall 2015 Theorems 9.4 and 9.5
^ Hall 2015 Theorem 12.6
^ Knapp, A. W. (2003). "Reviewed work: Matrix Groups: An Introduction to Lie Group Theory, Andrew Baker; Lie Groups: An Introduction through Linear Groups, Wulf Rossmann". The American Mathematical Monthly. 110 (5): 446–455. doi:10.2307/3647845. JSTOR 3647845.

[1] Dixmier 1996, Theorem 7.2.6.

[9.4_and_9.5-2] Hall 2015 Theorems 9.4 and 9.5

[12.6-3] Hall 2015 Theorem 12.6

[4] Knapp, A. W. (2003). "Reviewed work: Matrix Groups: An Introduction to Lie Group Theory, Andrew Baker; Lie Groups: An Introduction through Linear Groups, Wulf Rossmann". The American Mathematical Monthly. 110 (5): 446–455. doi:10.2307/3647845. JSTOR 3647845.

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