Table of Contents
I Introduction to Quantum Mechanics.- 1 Background: The Duality of Nature.- 2 The Motion of Wave Packets: Fourier Analysis.- 3 The Schrödinger Wave Equation and Probability Interpretation.- 4 Schrödinger Theory: The Existence of Discrete Energy Levels.- 5 Harmonic Oscillator Calculations.- 6 Further Interpretation of the Wave Function.- 7 The Eigenvalue Problem.- 8 Spherical Harmonics, Orbital Angular Momentum.- 9-Step operators for the Equation.- 10 The Radial Functions for the Hydrogenic Atom.- 11 Shape-Invariant Potentials: Soluble One-Dimensional Potential Problems.- 12 The Darboux Method: Supersymmetric Partner Potentials.- 13 The Vector Space Interpretation of Quantum-Mechanical Systems.- 14 The Angular Momentum Eigenvalue Problem (Revisited).- 15 Rigid Rotators: Molecular Rotational Spectra.- 16 Transformation Theory.- 17 Another Example: Successive Polarization Filters for Beams of Spin s = 1/2 Particles.- 18 Transformation Theory for Systems with Continuous Spectra.- 19 Time-Dependence of State Vectors, Algebraic Techniques, Coherent States.- II Time-Independent Perturbation Theory.- 20 Perturbation Theory.- 21 Stationary-State Perturbation Theory.- 22 Example 1: The Slightly Anharmonic Oscillator.- 23 Perturbation Theory for Degenerate Levels.- 24 The Case of Nearly Degenerate Levels.- 25 Magnetic Field Perturbations.- 26 Fine Structure and Zeeman Perturbations in Alkali Atoms.- III Angular Momentum Theory.- 27 Angular Momentum Coupling Theory.- 28 Symmetry Properties of Clebsch—Gordan Coefficients.- 29 Invariance of Physical Systems Under Rotations.- 30 The Clebsch—Gordan Series.- 31 Spherical Tensor Operators.- 32 The Wigner—Eckart Theorem.- 33 Nuclear Hyperfine Structure in One-Electron Atoms.- *34 Angular Momentum Recompiling: Matrix Elements of Coupled Tensor Operators in an Angular Momentum Coupled Basis.- *35 Perturbed Coulomb Problems via SO(2,1) Algebra.- 36 The WKB Approximation.- 37 Applications of the WKB Approximation.- IV Systems of Identical Particles.- 38 The Two-Electron Atom.- 39 n-Identical Particle States.- 40 The Variational Method.- V Scattering Theory.- 41 Introduction to Scattering Theory.- 42 The Rayleigh—Faxen—Holtzmark Partial Wave Expansion: Phase Shift Method.- 43 A Specific Example: Scattering from Spherical Square Well Potentials.- 44 Scattering Resonances: Low-Energy Scattering.- 45 Integral Equation for Two-Body Relative Motion: Scattering Green’s Functions in Coordinate Representation.- 46 The Born Approximation.- 47 Operator Form of Scattering Green’s Function and the Integral Equation for the Scattering Problem.- 48 Inelastic Scattering Processes and Rearrangement Collisions.- 49 Differential Scattering Cross Sections for Rearrangement Collisions: Born Approximation.- 50 A Specific Example of a Rearrangement Collision: The (d, p) Reaction on Nucleus A.- 51 The S Matrix.- 52 Scattering Theory for Particles with Spin.- 53 Scattering of Spin 1/2 Particles from Spinless Target: Partial Wave Decomposition.- 54 The Polarization Vector.- 55 Density Matrices.- 56 Isospin.- VI Time-Dependent Perturbation Theory.- 57 Time-Dependent Perturbation Expansion.- 58 Oscillating Magnetic Fields: Magnetic Resonance.- 59 Sudden and Adiabatic Approximations.- VII Atom—Photon Interactions.- 60 Interaction of Electromagnetic Radiation with Atomic Systems.- 61 Photons: The Quantized Radiation Field.- 62 Vector Spherical Harmonics.- 63 The Emission of Photons by Atoms: Electric Dipole Approximation.- 64 The Photoelectric Effect: Hydrogen Atom.- 65 Spontaneous Photon Emission: General Case: Electric and Magnetic Multipole Radiation.- 66 Scattering of Photons by Atomic Systems.- 67 Resonance Fluorescence Cross Section.- 68 Natural Line Width: Wigner—Weisskopf Treatment.- VIII Introduction to Relativistic Quantum Mechanics.- 69 Dirac Theory: Relativistic Quantum Theory of Spin-1/2 Particles.- 70 Lorentz Covariance of the Dirac Equation.- 71 Bilinear Covariants.- 72 Simple Solutions: Free Particle Motion: Plane Wave Solutions.- 73 Dirac Equation for a Particle in an Electromagnetic Field.- 74 Pauli Approximation to the Dirac Equation.- 75 The Klein Paradox: An Example from the History of Negative Energy State Difficulties: The Positron Interpretation.- 76 Exact Solutions for the Dirac Equation for Spherically Symmetric Potentials.- 77 The MIT Bag Model: The Dirac Equation for a Quark Confined to a Spherical Region.- IX Introduction to Many-Body Theory.- 78 Many-Body Formalism.- 79 Many-Body Techniques: Some Simple Applications.