Template:Integrate

Template:Multiple issues

Definition

An isotypical or primary representation of a group G is a unitary representation ${\displaystyle \pi :G⟶\mathcal{ℬ}(\mathcal{\mathscr{H}})}$ such that any two subrepresentations have equivalent subsubrepresentations.

This is to relate to primary or factor representation of a C*-algebra, or to the notion of factor for a von Neumann algebra: the representation ${\displaystyle \pi }$ of G is isotypicall iff ${\displaystyle \pi (G{)}^{{\text{'}}^{\prime }}}$ is a factor.

This term more generally used in the context of semisimple module.

Example

Let G be a compact group. A corollary of the Peter-Weyl theorem has that any unitary representation ${\displaystyle \pi :G⟶\mathcal{ℬ}(\mathcal{\mathscr{H}})}$ on a separable Hilbert space ${\displaystyle \mathcal{\mathscr{H}}}$ is a possibly infinite direct sum of finite dimensional irreducible representations. An isotypical representation is a direct sum of the equivalent irreducible representations that appear, possibly multiple times, in ${\displaystyle \mathcal{\mathscr{H}}}$.

References

Mackey

"C* algebras", Jacques Dixmier, Chapter 5

"Lie Groups", Claudio Procesi, def. p. 156.

Template:Abstract-algebra-stub