Difference between revisions of "Representation of a compact group(2)"

A homomorphism of a compact group into the group of continuous linear automorphisms of a (complex) Banach space that is continuous with respect to the strong operator topology.

Let $ G $ be a compact group, let $ V $ be a Banach space and let $ \phi : \ G \rightarrow \mathop{\rm GL}\nolimits (V) $ be a representation. If $ V = H $ is a Hilbert space and $ \phi (g) $ is a unitary operator for every $ g \in G $ , then $ \phi $ is called a unitary representation. There always is an equivalent norm in $ H $ for which $ \phi $ is unitary.

Every irreducible unitary representation (cf. Irreducible representation) of a compact group $ G $ is finite-dimensional. Let $ \{ {\rho ^ \alpha } : {\alpha \in I} \} $ be the family of all possible pairwise inequivalent irreducible unitary representations of the group $ G $ . Every unitary representation $ \phi $ of $ G $ is an orthogonal sum of unique representations $ \phi ^ \alpha $ , $ \alpha \in I $ , such that $ \phi ^ \alpha $ is an orthogonal sum, possibly zero, of a set of representations equivalent to $ \rho ^ \alpha $ .

If $ G $ is finite, then the family $ \{ \rho ^ \alpha \} $ is also finite and contains as many elements as there are distinct conjugacy classes in $ G $ ( moreover, $ \sum _ {\alpha \in I} ( \mathop{\rm dim}\nolimits \ \rho ^ \alpha ) ^{2} = | G | $ ). The problem of studying these representations (computing their characters, finding explicit realizations, etc.) is the subject of an extensive theory (cf. Finite group, representation of a).

If $ G $ is a connected, simply-connected, compact Lie group and $ G _ {\mathbf C} $ is its complexification (cf. Complexification of a Lie group), then the description of the family $ \{ {\rho ^ \alpha } : {\alpha \in I} \} $ for $ G $ amounts (by restricting the representations to $ G $ ) to the description of the family of all irreducible pairwise inequivalent finite-dimensional rational representations of the reductive algebraic group $ G _ {\mathbf C} $ . The latter family, in turn, allows of a complete description by considering highest weights (cf. Representation with a highest weight vector).

In modern number theory and algebraic geometry one considers $ \ell $-adic representations of compact totally-disconnected groups (cf. [5], [6]).

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