covers the following topics: The classical description of a particle, Hilbert
space formalism, Group theory, Lie algebra, The Green function approach, The
evolution operator, Scattering theory, Quantum mechanics in practice, Dynamics
and driven systems.
lecture note explains the following topics: Schrodinger’s Equation, Piecewise
Potentials, Linear Algebra and Function Space, Angular Momentum and Spin,
Multiple Particles, Perturbation Theory – Fine Structure, Time Dependent
Perturbation Theory, Relativistic Quantum Mechanics: The Dirac Equation.
covers the following topics: Mathematical derour: Operator theory, Fourier
transform and the calculus of variations Dynamics, Observables, The uncertainty
principle, Spectral theory, Special cases, Many particle system, The Feynman
path integral, Quasi classical analysis, Resonances, Quantum field theory and
This note is
intended to teach quantum mechanics to undergraduate students as well as
graduate students. Topics covered includes: Classical Mechanics, Quantum
Mechanics, Time-Dependent Schr¨odinger Equation, Mathematical Preliminarie,
Approximate Methods in Quantum Mechanics, Quantum Mechanics in Crystals, Angular
Momentum, Density Matrix, 2 Quantization of Classical Fields, Schrodinger Wave
Fields, Quantum Information and Quantum Interpretation.
note covers the following topics: Special Relativity, Basic Quantum
Mechanics, Single-Particle Systems, Multiple-Particle Systems, Time Evolution,
Basic and Quantum Thermodynamics, Angular momentum and Electromagnetism.
This note introduces Quantum Mechanics at an advanced level
addressing students of Physics, Mathematics, Chemistry and Electrical
Engineering. It covers the following topics: Lagrangian Mechanics, Quantum
Mechanical Path Integral, The Schr¨odinger Equation, Linear Harmonic
Oscillator, Theory of Angular Momentum and Spin, Quantum Mechanical Addition
of Angular Momenta and Spin, Motion in Spherically Symmetric Potentials,
Interaction of Charged Particles with Electromagnetic Radiation,
Many–Particle Systems, Relativistic Quantum Mechanics, Spinor Formulation of
Relativistic Quantum Mechanics and Symmetries in Physics.
note covers the following topics: Introduction to Superposition,
Experimental Facts of Life, The Wave Function, Expectations, Momentum, and
Uncertainty , Operators and the Schrödinger Equation, Time Evolution and the
Schrödinger Equation, Energy Eigenstates and Quantum Harmonic Oscillator.
Author(s): Prof. Allan Adams, Prof. Matthew Evans and Prof. Barton