# Category:Representation theory of groups

Here is a list of articles in the category **Representation theory of groups** of the Computing portal that unifies foundations of mathematics and computations using computers.

## Subcategories

This category has the following 4 subcategories, out of 4 total.

### A

### F

### R

### U

## Pages in category "Representation theory of groups"

The following 39 pages are in this category, out of 39 total.

- Group representation
*(computing)*

### A

- Atlas of Lie groups and representations
*(computing)*

### B

- B-admissible representation
*(computing)* - Burnside ring
*(computing)*

### C

- Character group
*(computing)* - Character theory
*(computing)* - Commutation theorem
*(computing)* - Complementary series representation
*(computing)* - Complex conjugate representation
*(computing)* - Complex representation
*(computing)*

### D

- Decomposition matrix
*(computing)* - Dual representation
*(computing)*

### F

- Fontaine's period rings
*(computing)* - Frobenius–Schur indicator
*(computing)*

### G

- G-module
*(computing)* - Gan–Gross–Prasad conjecture
*(computing)* - Gelfand pair
*(computing)* - Gelfand–Raikov theorem
*(computing)* - Group action
*(computing)* - Group action (mathematics)
*(computing)* - Group ring
*(computing)*

### K

- K-finite
*(computing)*

### M

- Matrix coefficient
*(computing)* - McKay conjecture
*(computing)* - Molien series
*(computing)* - Monomial representation
*(computing)* - Multiplicity-one theorem
*(computing)*

### P

- P-adic Hodge theory
*(computing)* - Partial group algebra
*(computing)* - Positive-definite function on a group
*(computing)* - Projective representation
*(computing)*

### R

- Regular representation
*(computing)* - Representation on coordinate rings
*(computing)* - Representation rigid group
*(computing)* - Representation ring
*(computing)* - Representation theory of diffeomorphism groups
*(computing)*

### S

- Schur orthogonality relations
*(computing)* - Springer correspondence
*(computing)*

### T

- Tempered representation
*(computing)*