Representations of classical Lie groups

In mathematics, the finite-dimensional representations of the complex classical Lie groups $GL(n,\mathbb {C} )$ , $SL(n,\mathbb {C} )$ , $O(n,\mathbb {C} )$ , $SO(n,\mathbb {C} )$ , $Sp(2n,\mathbb {C} )$ , can be constructed using the general representation theory of semisimple Lie algebras. The groups $SL(n,\mathbb {C} )$ , $SO(n,\mathbb {C} )$ , $Sp(2n,\mathbb {C} )$ are indeed simple Lie groups, and their finite-dimensional representations coincide^[1] with those of their maximal compact subgroups, respectively $SU(n)$ , $SO(n)$ , $Sp(n)$ . In the classification of simple Lie algebras, the corresponding algebras are

{\begin{aligned}SL(n,\mathbb {C} )&\to A_{n-1}\\SO(n_{\text{odd}},\mathbb {C} )&\to B_{\frac {n-1}{2}}\\SO(n_{\text{even}},\mathbb {C} )&\to D_{\frac {n}{2}}\\Sp(2n,\mathbb {C} )&\to C_{n}\end{aligned}}

However, since the complex classical Lie groups are linear groups, their representations are tensor representations. Each irreducible representation is labelled by a Young diagram, which encodes its structure and properties.

^ William Fulton; Joe Harris (2004). "Representation Theory". Graduate Texts in Mathematics. doi:10.1007/978-1-4612-0979-9. ISSN 0072-5285. Wikidata Q55865630.

[Fulton-1] William Fulton; Joe Harris (2004). "Representation Theory". Graduate Texts in Mathematics. doi:10.1007/978-1-4612-0979-9. ISSN 0072-5285. Wikidata Q55865630.

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