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16. Angular Momentum. Angular Momentum Operator Angular Momentum Coupling Spherical Tensors Vector Spherical Harmonics. Principles of Quantum Mechanics. State of a particle is described by a wave function ( r , t ).
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16. Angular Momentum Angular Momentum Operator Angular Momentum Coupling Spherical Tensors Vector Spherical Harmonics
Principles of Quantum Mechanics State of a particle is described by a wave function (r,t). Probability of finding the particle at time twithin volume d 3raround r is Dynamics of particle is given by the time-dependent Schrodinger eq. Hamiltonian SI units: Stationary states satisfy the time-independent Schrodinger eq. with
Let be an eigenstate of A with eigenvalue a, i.e. Measurement of A on a particle in state will give a and the particle will remain in afterwards. OperatorsA & B have a set of simultaneous eigenfunctions. A stationary state is specified by the eigenvalues of the maximal set of operators commuting with H. Measurement of A on a particle in state will give one of the eigenvalues a of Awith probability and the particle will be in aafterwards. uncertainty principle
1. Angular Momentum Operator Quantization rule : Kinetic energy of a particle of mass : Angular momentum : Rotational energy : angular part of T
Ex.3.10.32 with
Central Force Cartesian commonents Ex.3.10.31 : eigenstates of H can be labeled by eigenvalues of L2 & Lz, i.e., by l,m. Ex.3.10.29-30
Ladder Operators Ladder operators Let lm be a normalized eigenfunction of L2 & Lz such that is an eigenfunction of Lzwith eigenvalue ( m 1) . Raising Lowering i.e. L are operators
is an eigenfunction of L2with eigenvalue l2 . i.e. lm normalized Ylmthus generated agrees with the Condon-Shortley phase convention. areal
For m 0 : 0 For m 0 : 0 m = 1 Multiplicity = 2l+1
Example 16.1.1.Spherical Harmonics Ladder for l = 0,1,2,…
Spinors Intrinsic angular momenta (spin) S of fermions have s = half integers. E.g., for electrons Eigenspace is 2-D with basis Or in matrix form : spinors S are proportional to the Pauli matrices.
Example 16.1.2. Spinor Ladder Fundamental relations that define an angular momentum, i.e., can be verified by direct matrix calculation. Mathematica Spinors:
Summary, Angular Momentum Formulas General angular momentum : Eigenstates JM: J = 0, 1/2, 1, 3/2, 2, … M = J, …, J
2. Angular Momentum Coupling Let Implicit summation applies only to the k,l,n indices
Example 16.2.1.Commutation Rules for J Components e.g.
Maximal commuting set of operators : or eigen states : Adding (coupling) means finding Solution always exists & unique since is complete.
Vector Model Total number of states : Mathematica i.e. Triangle rule
Clebsch-Gordan Coefficients For a given j1 & j2, we can write the basis as & Both set of basis are complete : Clebsch-Gordan Coefficients (CGC) Condon-Shortley phase convention
Ladder Operation Construction Repeated applications of Jthen give the rest of the multiplet Orthonormality :
Clebsch-Gordan Coefficients Full notations : real Only terms with no negative factorials are included in sum.
Table of Clebsch-Gordan Coefficients Ref: W.K.Tung, “Group Theory in Physics”, World Scientific (1985)
Wigner 3 j - Symbols Advantage : more symmetric
Table 16.1 Wigner 3j-Symbols Mathematica
Example 16.2.3.Coupling of p & d Electrons Simpler notations : where Mathematica
