Modern Quantum MechanicsCambridge University Press, 21.09.2017 Modern Quantum Mechanics is a classic graduate level textbook, covering the main quantum mechanics concepts in a clear, organized and engaging manner. The author, Jun John Sakurai, was a renowned theorist in particle theory. The second edition, revised by Jim Napolitano, introduces topics that extend the text's usefulness into the twenty-first century, such as advanced mathematical techniques associated with quantum mechanical calculations, while at the same time retaining classic developments such as neutron interferometer experiments, Feynman path integrals, correlation measurements, and Bell's inequality. A solution manual for instructors using this textbook can be downloaded from www.cambridge.org/9781108422413. |
Inhalt
Fundamental Concepts | 1 |
Quantum Dynamics | 66 |
Theory of Angular Momentum | 157 |
Symmetry in Quantum Mechanics | 262 |
Approximation Methods | 303 |
Scattering Theory | 386 |
Identical Particles | 446 |
Relativistic Quantum Mechanics | 486 |
Electromagnetic Units | 519 |
Brief Summary of Elementary Solutions to Schrödingers Wave Equation | 523 |
Proof of the AngularMomentum Addition Rule Given by Equation 3838 | 533 |
| 535 | |
| 537 | |
Andere Ausgaben - Alle anzeigen
Häufige Begriffe und Wortgruppen
amplitude angle angular momentum approximation base kets beam classical Clebsch-Gordan coefficients coefficients commutation relations component consider corresponding defined degeneracy density derive diagonal differential equation dimension Dirac equation discuss eigenfunctions eigenkets eigenstates eigenvalues electromagnetic electron energy eigenkets energy eigenvalues energy levels energy shift ensemble evaluate example expectation value explicitly Figure follows free-particle given Hamiltonian Heisenberg picture Hermitian hydrogen atom infinitesimal integral interaction ket space Klein-Gordon equation linear magnetic field matrix elements measurement normalization observable obtain orthogonal parity particle perturbation theory phase physical polarized position potential problem properties quantization quantum mechanics quantum number relativistic result rotation operator scattering Schrödinger equation Schrödinger picture simple harmonic oscillator solution solve spherical spin systems Suppose symmetry tensor theorem time-dependent time-evolution operator transformation unitary vector wave equation wave function write z-axis zero