This lecture note explains the
following topics: The Early History of Quantum Mechanics, The Wave Function, The
Two Slit Experiment, Wave Mechanics, Particle Spin and the Stern-Gerlach
Experiment, Probability Amplitudes, Vector Spaces in Quantum Mechanics, State
Spaces of Infinite Dimension, Matrix Representations of State Vectors and
Operators, Probability, Expectation Value and Uncertainty, Time Evolution in
Quantum Mechanics.
This is an introductory
note on quantum mechanics. Topics covered includes: A Quantum Particle in One
Dimension, The Formalism of Quantum Mechanics, A Quantum Particle in Three
Dimensions.
This book
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.
This
lecture note explains the following topics: Classical Mechanics, Abstract vector
spaces, Functions as vectors, Postulates of Quantum Mechanics, The Wavefunction,
The Uncertainty Principle, Scattering Theory, Stationary States, Angular
Momentum, The Hydrogen Atom, Spin.
This
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.