Pages that link to "Number of irreducible representations over reals equals number of equivalence classes under real conjugacy"
The following pages link to Number of irreducible representations over reals equals number of equivalence classes under real conjugacy:
View (previous 50 | next 50) (20 | 50 | 100 | 250 | 500)- Linear representation theory of cyclic group:Z3 (← links)
- Linear representation theory of alternating group:A4 (← links)
- Number of irreducible representations equals number of conjugacy classes (← links)
- Number of irreducible representations over complex numbers with real character values equals number of conjugacy classes of real elements (← links)
- Number of irreducible representations over reals equals number of real conjugacy classes (redirect page) (← links)
- Number of irreducible representations over rationals equals number of equivalence classes under rational conjugacy (← links)
- Linear representation theory of cyclic group:Z5 (← links)
- Linear representation theory of cyclic group:Z8 (← links)
- Linear representation theory of direct product of Z4 and Z2 (← links)
- Number of equivalence classes under real conjugacy (← links)
- Number of irreducible representations over complex numbers with rational character values need not equal number of conjugacy classes of rational elements (← links)
- Number of irreducible representations over complex numbers with rational character values equals number of conjugacy classes of rational elements for any finite group whose cyclotomic splitting field is a cyclic extension of the rationals (← links)
- Orbit sizes for irreducible representations may differ from orbit sizes for conjugacy classes under action of automorphism group (← links)