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Lecture Notes for Quantum Mechanics F.H.L. Essler
The topics discussed in this lecture notes include: Probability Amplitudes and Quantum States, Operators and Observables, Position and Momentum Representations,Time Evolution in Quantum Mechanics,Wave mechanics, Harmonic Oscillators,Transformations and Symmetries,Heisenberg picture and Heisenberg equation of motion, Rotational invariance and angular momentum as a good quantum number,Position representation and angular momentum, Angular momentum and magnetic moments,Spin and total angular momentum,QM systems composed of two parts, Product States vs entangled states, Addition of angular momenta, EPR experiment and Bell inequalities, Position representation, Energy eigenvalues and emission spectra of hydrogen, Explicit form of the wave functions.
Author(s): F.H.L. Essler, The Rudolf Peierls Centre for Theoretical Physics, Oxford University
97 Pages
Notes on Quantum Mechanics with Examples of Solved Problems
This book explains the following topics: Schrodinger equation, Wronskian theorem, Hilbert Spaces for Physicists, Postulates of Quantum Mechanics, Harmonic Oscillator in Operatorial Form, Angular momentum quantization, Symmetries in Quantum Mechanics, Spin, Identical particles, Hydrogen atom, Time-dependent and independent perturbation theory, Path integral approach to quantum mechanics, : Semiclassical quantum mechanics.
Author(s): Ennio Gozzi
317 Pages
Lecture Notes on Quantum Mechanics J Greensite
This note explains the following topics: The Classical State, Historical Origins of Quantum Mechanics, The Wave-like Behaviour of Electrons, Energy and Uncertainty, Quantum State, Operators and Observations, Rectangular Potentials, The Harmonic Oscillator, Spectrum of Angular Momentum, Aspects of Spin, Electron Spin, Approximation Methods, Quantum Mechanics as Linear Algebra, Feynman Path-Integral Quantization.
Author(s): J. Greensite
391 Pages
Mathematical Concepts of Quantum Mechanics
This book 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 Renormalization group.
Author(s): S. Gustafson and I . M Sigal
185 Pages
Quantum Mechanics I by S H Patil
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Author(s): NA
NA Pages
Theoretical Concepts of Quantum Mechanics
This book, which brought together an international community of invited authors, represents a rich account of foundation, scientific history of quantum mechanics, relativistic quantum mechanics and field theory, and different methods to solve the Schrodinger equation.
Author(s): Mohammad Reza Pahlavani
598 Pages
This note covers the following topics: Bound States, Discreet Energy Levels, Electron Diffraction, Exploring Quantum Tunneling, Uncertainty Principle, Interpreting Wave Functions, Sketching Wave Functions, Shape of the Wave Function, Wave Packet, Wave Functions and Energies in Atoms.
Author(s): Kansas State University
NA Pages
Classical Electromagnetism A Graduate Course
This book covers the following topics: Maxwell’s Equations, Electrostatic Fields, Potential Theory, Magnetostatic Fields, Magnetostatics in Magnetic Media, Wave Propagation in Uniform Dielectric Media, Wave Propagation in Inhomogeneous Dielectric Media, Radiation and Scattering, Resonant Cavities and Waveguides, Multipole Expansion, Relativity and Electromagnetism.
Author(s): Richard Fitzpatrick
307 Pages
Quantum Mechanics I (Peter S. Riseborough PDF 500p)
This book explains the following topics related to Quantum Mechanics: Principles of Classical Mechanics, Failure of Classical Mechanics, Principles of Quantum Mechanics, Applications of Quantum Mechanics, The Rotating Planar Oscillator, Dirac Formulation.
Author(s): Peter S. Riseborough
500 Pages
This 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 Zwiebach
NA Pages
Quantum Mechanics Online Lecture Notes
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Author(s): NA
NA Pages
Introduction to quantum mechanics [PDF]
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Lecture notes for Quantum Mechanics I [PDF 41p]
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Lecture notes for Quantum Mechanics II [PDF 42p]
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NA Pages
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Introduction to Quantum Mechanics
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