Lectures on Group Theory and Particle Theory |
Contents
isomorphism automorphism | 13 |
semisimple group | 25 |
Vector spaces | 41 |
Copyright | |
16 other sections not shown
Common terms and phrases
Abelian adjoint angular momentum antisymmetric tensor associated automorphism baryon basis called commutation components conjugate consequently corresponding covariant deduce defined denote dimension easily eigenvalues electromagnetic elementary particles elements equal equation equivalent example form a group formula function fundamental invariants given group G group isomorphic Group Theory H₁ Hermitian homomorphism hypercharge hyperplane integer interactions invariance group invariant subgroup irreducible representations isomorphic isospin Lagrangian Let us consider Lie algebra Lie group linear Lorentz group Lorentz transformation mapping mass matrix maximum weight mesons multiplication nucleon null observer obtain operator orthogonal parity permutation Phys Physics pion plane Poincaré group properties proton Prove the relations quantum reducible respect roots rotation group scalar product semi-simple Show simple space-like space-time spin spinor SU(n subalgebra subspace symmetry symplectic tation tensor of rank theorem unitary vector space Verify Young diagrams zero
References to this book
Group Representation Theory for Physicists Jin-Quan Chen,Jialun Ping,Fan Wang No preview available - 2002 |