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8.06 Quantum Physics III

8.06 Quantum Physics III (Spring 2018, MIT OCW). Instructor: Prof. Barton Zwiebach. This course is a continuation of 8.05 Quantum Physics II. It introduces some of the important model systems studied in contemporary physics, including two-dimensional electron systems, the fine structure of hydrogen, lasers, and particle scattering.

Part 1. Time Independent Perturbation Theory and WKB Approximation
In this section, we discuss in detail non-degenerate and degenerate time-independent perturbation theory. As an application and illustration of the methods, we study the fine structure of the hydrogen atom as well as the Zeeman effect, both in its weak and strong forms. We develop the Wentzel-Kramers-Brillouin (WKB) approximation, useful for time-independent problems that involve potentials with slow-varying spatial dependence.

Part 2. Time Dependent Perturbation Theory and Adiabatic Approximation
In this section, we begin by developing perturbation theory for time-dependent Hamiltonians. We then turn to Fermi's Golden Rule, and then to the interaction of light with atoms, focusing on the processes of absorption, stimulated emission, and spontaneous emission. We discuss charged particles in electromagnetic fields and derive the Landau levels of a particle in a uniform magnetic field. We study in detail the Adiabatic approximation, discussing Landau-Zener transitions, Berry's phase, and the Born-Oppenheimer approximation for molecules.

Part 3. Scattering and Identical Particles
The final part of the course begins with a study of scattering. We discuss cross sections and develop the theory of partial waves and phase shifts. An integral reformulation of the scattering problem leads to the Born approximation. We then turn to the subject of identical particles. We explain the exchange degeneracy problem and develop the machinery of permutation operators, symmetrizers and anti-symmetrizers. We discuss the symmetrization postulate and discuss the construction and properties of multi particle bosonic and fermionic states. (from ocw.mit.edu)

Lecture 09.1 - The Interaction Picture and Time Evolution


Go to the Course Home or watch other lectures:

Part 1. Time Independent Perturbation Theory and WKB Approximation
Lecture 01 - Time Independent Perturbation Theory
Lecture 02 - Time Independent Perturbation Theory (cont.)
Lecture 03 - Degenerate Perturbation Theory
Lecture 04 - Hydrogen Atom Fine Structure
Lecture 05 - Hydrogen Atom Fine Structure (cont.)
Lecture 06 - Zeeman Effect and Introduction to the Semiclassical Approximation
Lecture 07 - The Semiclassical WKB Approximation
Lecture 08 - WKB (cont.), Airy Functions and Connection Formulae
Lecture 09 - Time Dependent Perturbation Theory
Part 2. Time Dependent Perturbation Theory and Adiabatic Approximation
Lecture 10 - Fermi's Golden Rule
Lecture 11 - Fermi's Golden Rule for Harmonic Transitions
Lecture 12 - Hydrogen Ionization (cont.), Light and Atoms
Lecture 13 - Light and Atoms (cont.), Charged Particles in Electromagnetic Fields
Lecture 14 - Charged Particles in Electromagnetic Fields (cont.)
Lecture 15 - Adiabatic Approximation
Lecture 16 - Adiabatic Approximation (cont.)
Lecture 17 - Adiabatic Approximation: Berry's Phase
Lecture 18 - Adiabatic Approximation: Molecules
Part 3. Scattering and Identical Particles
Lecture 19 - Scattering
Lecture 20 - Scattering (cont.)
Lecture 21 - Scattering (cont.)
Lecture 22 - Scattering (cont.), Identical Particles
Lecture 23 - Identical Particles (cont.)
Lecture 24 - Identical Particles (cont.)