Lie Algebras In Particle Physics: From Isospin To Unified Theories

adjoint representation annihilation operators antiquarks antisymmetric tensor automorphism baryon called Cartan color SU(3 commutation relations complex conjugate components consider corresponding creation operators D₂ Dynkin diagram eigenstates eigenvalues example fundamental representation fundamental weights group theory H₁ H₂ hermitian highest weight II-system integers invariant tensor irreducible representation isospin label Lecture Note Lie algebra Lie groups linear combination lower indices lowering operators mass matrix element mesons multiplet notation obtained octet orthogonal pair particle physics Pauli matrices permutations physicists positive roots PROBLEMS FOR CHAPTER proton quark model regular maximal subalgebras repre right-handed satisfy sentation simple Lie simple roots singlet spin spinor representation strong interactions SU(n subgroup subspace symmetry tableau tensor operators tensor product tion traceless transforms unified theories unique upper indices vectors zero α α α αβ