ndung200790
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Why generator matrices of a compact Lie algebra are Hermitian?I know that generators of adjoint representation are Hermitian,but how about the general representaion of Lie groups?
Perhaps Theorem 3.11 in this paper.ndung200790 said:Why generator matrices of a compact Lie algebra are Hermitian?I know that generators of adjoint representation are Hermitian,but how about the general representaion of Lie groups?
I think it is true only in case of su(n),where it follows follows from U+U=1.ndung200790 said:Why generator matrices of a compact Lie algebra are Hermitian?I know that generators of adjoint representation are Hermitian,but how about the general representaion of Lie groups?
Are you just guessing, or did you find an error in the paper that I cited.andrien said:I think it is true only in case of su(n),where it follows follows from U+U=1.
I have no idea what you're talking about, andrien. He says the operator is unitary.andrien said:Well,the theorem given is talking about unitary representation of some operator representation of some compact group G.This unitary representation is different from the unitarity of operator.A unitary representaion simply concerns about finding an orthogonal set of basis in the group space,so I don't see a direct connection of that theorem with the unitarity which leads to hermitian generator.Probably you know how to make a connection.
It's a unitary operator with a unitary matrix. Unitary means unitary. I see nothing subtle going on.Thus the operator O′= SOS−1 is unitary on S, and its matrix representations will also be unitary.
ndung200790 said:Why generator matrices of a compact Lie algebra are Hermitian?I know that generators of adjoint representation are Hermitian,but how about the general representaion of Lie groups?
You might, if you took a look at the paper I cited in #3 above. The proof is trivial.dextercioby said:I see no reason for it.