jdstokes
Jan28-08, 03:30 AM
Hi all, I asked this on the Quantum Physics board but didn't get a response.
I'm reading Cahn's book on semi-simple lie algebras and their representations.
http://www-physics.lbl.gov/~rncahn/book.html
In chapter 1, he attempts to build a (2j+1)-dimensional representation T of the Lie algebra of SO(3) starting with the abstract commutation relations
[T_z,T_+] = T_+, \quad [T_z,T_-] = - T_-,\quad [T_+,T_-] = 2T_z Eq (I.14).
He begins by defining the action of T_z,T_+ on the vector v_j by
T_z v_j = j v_j, \quad T_+ v_j = 0
but he does not explain what the v_j's are. How does one even know that such vectors exist?
Any help would be greatly appreciated.
I'm reading Cahn's book on semi-simple lie algebras and their representations.
http://www-physics.lbl.gov/~rncahn/book.html
In chapter 1, he attempts to build a (2j+1)-dimensional representation T of the Lie algebra of SO(3) starting with the abstract commutation relations
[T_z,T_+] = T_+, \quad [T_z,T_-] = - T_-,\quad [T_+,T_-] = 2T_z Eq (I.14).
He begins by defining the action of T_z,T_+ on the vector v_j by
T_z v_j = j v_j, \quad T_+ v_j = 0
but he does not explain what the v_j's are. How does one even know that such vectors exist?
Any help would be greatly appreciated.