Isotypical representation

In group theory, an isotypical, primary or factor representation[1] of a group G is a unitary representation such that any two subrepresentations have equivalent sub-subrepresentations.[2] This is related to the notion of a primary or factor representation of a C*-algebra, or to the factor for a von Neumann algebra: the representation of G is isotypical iff is a factor.

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

Property

One of the interesting property of this notion lies in the fact that two isotypical representations are either quasi-equivalent or disjoint (in analogy with the fact that irreducible representations are either unitarily equivalent or disjoint).

This can be understood through the correspondence between factor representations and minimal central projection (in a von Neumann algebra),.[3] Two minimal central projections are then either equal or orthogonal.

Example

Let G be a compact group. A corollary of the Peter–Weyl theorem has that any unitary representation on a separable Hilbert space is a possibly infinite direct sum of finite dimensional irreducible representations. An isotypical representation is any direct sum of equivalent irreducible representations that appear (typically multiple times) in .

gollark: I host my stuff locally on an actual dedicated server which may or may not be a raspberry pi, because php bad lol.
gollark: I meant TLC and QLC.
gollark: * TLC
gollark: It's also from back before they started using MLC and QLC, so it ought to last for *ages*.
gollark: And it's not full, so meh.

References

  1. Deitmar Principles of Harmonic analysis, § 8.3 p.162
  2. Higson, Nigel; Roe, John. "Operator Algebras" (PDF). psu.edu. Retrieved 11 March 2016.
  3. Dixmier C*-algebras, Prop. 5.2.7 p.117
  • Mackey
  • "C* algebras", Jacques Dixmier, Chapter 5
  • "Lie Groups", Claudio Procesi, def. p. 156.
  • "Group and symmetries", Yvette Kosmann-Schwarzbach


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