Introduction to Quantum Mechanics (2nd Ed.)
Auteur : Blinder S.M.
Introduction to Quantum Mechanics, 2nd Edition provides an accessible, fully updated introduction to the principles of quantum mechanics. It outlines the fundamental concepts of quantum theory, discusses how these arose from classic experiments in chemistry and physics, and presents the quantum-mechanical foundations of current scientific developments.Beginning with a solid introduction to the key principles underpinning quantum mechanics in Part 1, the book goes on to expand upon these in Part 2, where fundamental concepts such as molecular structure and chemical bonding are discussed. Finally, Part 3 discusses applications of this quantum theory across some newly developing applications, including chapters on Density Functional Theory, Statistical Thermodynamics and Quantum Computing.Drawing on the extensive experience of its expert author, Introduction to Quantum Mechanics, 2nd Edition is a lucid introduction to the principles of quantum mechanics for anyone new to the field, and a useful refresher on fundamental knowledge and latest developments for those varying degrees of background.
1. Atoms and Photons
2. Waves and Particles
3. Quantum Mechanics of Some Simple Systems
4. Principles of Quantum Mechanics
5. Special Functions
6. Harmonic Oscillator
7. Angular Momentum
8. Hydrogen Atom
9. Helium Atom
10. Atomic Structure
11. The Chemical Bond
12. Diatomic Molecular Orbitals
13. Polyatomic Molecules and Solids
14. Density Functional Theory
15. Molecular Symmetry
16. Molecular Spectroscopy
17. Statistical Thermodynamics
18. Nuclear Magnetic Resonance
19. Wonders of the Quantum World
20. Quantum Computers
- Presents a fully updated accounting that reflects the most recent developments in Quantum Theory and its applications
- Includes new chapters on Special Functions, Density Functional Theory, Statistical Thermodynamics and Quantum Computers
- Presents additional problems and exercises to further support learning
Date de parution : 10-2020
Ouvrage de 434 p.
15x22.8 cm
Thèmes d’Introduction to Quantum Mechanics :
Mots-clés :
anharmonic oscillator; atomic configuration; aufbau principle; Bessel functions; Born interpretation; Compton effect; Dirac deltafunction; Dirac notation; double-slit experiment; eigenvalues and eigenfunctions; expectation value; gamma function; Gaussian; group theory; Harmonic oscillator; Hartree-Fock; Heisenberg uncertainty principle; Helium atom; Hermite polynomial; Hermitian operators; Hylleraas computation; ladder operators; Laguerre polynomial; Legendre polynomial; Leibniz"s formula; Madelung n+l rule; Molecular symmetry; molecular-orbital classification; particles; periodic table; perturbation theory; postulates of quantum mechanics; quantum theory of radiation; Schrödinger equation; self-consistent field; Slater determinant; spectroscopic transitions; spherical harmonics; spin orbitals exclusion principle; term symbol; variational method; variational principle; wavefunctions; wave-particle duality; Waves; zero-point energy