Description
Book SynopsisThe lecture notes presented here in facsimile were prepared by the Nobel Prize winner, Enrico Fermi, for students taking his course at the University of Chicago in 1954. This edition includes a set of Fermi's assigned problems as compiled by one of his former students, Robert A. Schluter.
Table of ContentsPreface to the First Edition 1: Optics - Mechanics Analogy 2: Schrodinger Equation 3: Simple One-Dimensional Problems 4: Linear Oscillator 5: W. K. B. Method 6: Spherical Harmonics 7: Central Forces 8: Hydrogen Atom 9: Orthogonality of Wave Functions 10: Linear Operators 11: Eigenvalues and Eigenfunction 12: Operators for Mass Point 13: Uncertainty Principle 14: Matrices 15: Hermitian Matrices - Eigenvalue Problems 16: Unitary Matrices - Transformations 17: Observables 18: The Angular Momentum 19: Time Dependence of Observables - Heisenberg Representation 20: Conservation Theorems 21: Time-Independent Perturbation Theory - Ritz Method 22: Case of Degeneracy or Quasi Degeneracy - Hydrogen Stark Effect 23: Time-Dependent Perturbation Theory - Born Approximation 24: Emission and Absorption of Radiation 25: Pauli Theory of Spin 26: Electron in Central Field 27: Anomalous Zeeman Effect 28: Addition of Angular Momentum Vectors 29: Atomic Multiplets 30: Systems with Identical Particles 31: Two-Electron System 32: Hydrogen Molecule 33: Collision Theory 34: Dirac's Theory of the Free Electron 35: Dirac Electron in Electromagnetic Field 36: Dirac Electron in Central Field - Hydrogen Atom 37: Transformations of Dirac Spinors Introduction to Problems for Notes on Quantum Mechanics Problems
