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SU(2) com a double cover de SO(3)

Explicació perfecta

Minut 39:30 (part 5)

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Recursos útils

Wikipedia

Representation theory of SU(2)

In the study of the representation theory of Lie groups, the study of representations of SU(2) is fundamental to the study of representations of semisimple Lie groups. It is the first case of a Lie group that is both a compact group and a non-abelian group. The first condition implies the representation theory is discrete: representations are direct sums of a collection of basic irreducible representations (governed by the Peter–Weyl theorem). The second means that there will be irreducible representations in dimensions greater than 1.

Representation theory of SU(2)

https://en.wikipedia.org/wiki/Representation_theory_of_SU(2)

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www.pas.rochester.edu

https://www.pas.rochester.edu/assets/pdf/undergraduate/su-2s_double_covering_of_so-3.pdf

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Intuïció: Cinta de Mobius

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Explicació

With respect to Lie groups, what is a double cover? (As a theoretical physicist would need to know.)

Answer (1 of 2): First of all, let me show you a simple but nontrivial example of a double cover. We start with the famous Möbius strip: It is a nice, non-orientable surface; if you trace its boundary, it is a circle. But now, let me show its double cover: See what is happening here? The double...

With respect to Lie groups, what is a double cover? (As a theoretical physicist would need to know.)

https://www.quora.com/With-respect-to-Lie-groups-what-is-a-double-cover-As-a-theoretical-physicist-would-need-to-know

With respect to Lie groups, what is a double cover? (As a theoretical physicist would need to know.)

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