Wolf, Joseph Albert, 1936-
Classification and Fourier inversion for parabolic subgroups with square integrable nilradical / [electronic resource] Joseph A. Wolf. - Providence : American Mathematical Society, 1979. - 1 online resource (iii, 166 p.) - Memoirs of the American Mathematical Society, v. 225 0065-9266 (print); 1947-6221 (online); . - Memoirs of the American Mathematical Society ; no. 225. .
"Volume 22."
Bibliography: p. 165-166.
1. Introduction Part I. Classification 2. Square integrability for nilpotent groups 3. Square integrability for nilradicals 4. Classification in the real split classical groups 5. Passage to the general classical group 6. Classification in the real split exceptional groups 7. Passage to the general exceptional group 8. Three consequences of the classification Part II. Fourier inversion 9. Framework for Fourier inversion 10. Fourier inversion inside groups of type A 11. Fourier inversion inside groups of types B and D 12. Fourier inversion inside groups of type C 13. Fourier inversion inside the group $G_2$ l4. Fourier inversion inside the group $F_4$ 15. Fourier inversion inside the group $E_6$ 16. Fourier inversion inside the group $E_7$ 17. Fourier inversion inside the group $E_8$
Access is restricted to licensed institutions
Electronic reproduction.
Providence, Rhode Island :
American Mathematical Society.
2012
Mode of access : World Wide Web
9781470406295 (online)
Lie groups.
Representations of groups.
Fourier transformations.
Universal enveloping algebras.
QA3 QA387 / .A57 no. 225
510/.8 s 512/.55
Classification and Fourier inversion for parabolic subgroups with square integrable nilradical / [electronic resource] Joseph A. Wolf. - Providence : American Mathematical Society, 1979. - 1 online resource (iii, 166 p.) - Memoirs of the American Mathematical Society, v. 225 0065-9266 (print); 1947-6221 (online); . - Memoirs of the American Mathematical Society ; no. 225. .
"Volume 22."
Bibliography: p. 165-166.
1. Introduction Part I. Classification 2. Square integrability for nilpotent groups 3. Square integrability for nilradicals 4. Classification in the real split classical groups 5. Passage to the general classical group 6. Classification in the real split exceptional groups 7. Passage to the general exceptional group 8. Three consequences of the classification Part II. Fourier inversion 9. Framework for Fourier inversion 10. Fourier inversion inside groups of type A 11. Fourier inversion inside groups of types B and D 12. Fourier inversion inside groups of type C 13. Fourier inversion inside the group $G_2$ l4. Fourier inversion inside the group $F_4$ 15. Fourier inversion inside the group $E_6$ 16. Fourier inversion inside the group $E_7$ 17. Fourier inversion inside the group $E_8$
Access is restricted to licensed institutions
Electronic reproduction.
Providence, Rhode Island :
American Mathematical Society.
2012
Mode of access : World Wide Web
9781470406295 (online)
Lie groups.
Representations of groups.
Fourier transformations.
Universal enveloping algebras.
QA3 QA387 / .A57 no. 225
510/.8 s 512/.55