quantum mechanics
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21—30 of 35 matching pages
21: Bibliography N
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Confluent hypergeometric equations and related solvable potentials in quantum mechanics.
J. Math. Phys. 41 (12), pp. 7964–7996.
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22: Bibliography G
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Quantum mechanics: fundamentals.
Second edition, Springer-Verlag, New York.
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Quantum Electrodynamics of Strong Fields: With an Introduction into Modern Relativistic Quantum Mechanics.
Texts and Monographs in Physics, Springer.
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23: Bibliography L
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Quantum Mechanics: Non-relativistic Theory.
Pergamon Press Ltd., Oxford.
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Solutions to a generalized spheroidal wave equation: Teukolsky’s equations in general relativity, and the two-center problem in molecular quantum mechanics.
J. Math. Phys. 27 (5), pp. 1238–1265.
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24: 10.73 Physical Applications
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►In quantum mechanics the spherical Bessel functions arise in the solution of the Schrödinger wave equation for a particle in a central potential.
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25: Bibliography P
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Introduction to quantum mechanics.
Dover Publications, Inc., New York.
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26: Bibliography B
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Moment equations for probability distributions in classical and quantum mechanics.
Phys. Rev. A 58 (3), pp. 1799–1809.
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Quantum mechanics of one- and two-electron atoms.
Springer-Verlag, Berlin.
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Quantum Mechanics of One- and Two-electron Atoms.
Rosetta edition, Plenum Publishing Corp., New York.
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27: Bibliography C
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Supersymmetry and quantum mechanics.
Phys. Rep. 251, pp. 267–385.
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Schrödinger Operators, with Applications to Quantum Mechanics and Global Geometry.
Springer Verlag, New York.
28: 22.19 Physical Applications
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►plays a prototypal role in classical mechanics (Lawden (1989, §5.2)), quantum mechanics (Schulman (1981, Chapter 29)), and quantum field theory (Pokorski (1987, p. 203), Parisi (1988, §14.6)).
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29: Bibliography D
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The constrained quantum mechanical harmonic oscillator.
Proc. Cambridge Philos. Soc. 62, pp. 277–286.
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30: Bibliography
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The Riemann Hypothesis and the Hamiltonian of a Quantum Mechanical System.
In Number Theory and Dynamical Systems (York, 1987), M. M. Dodson and J. A. G. Vickers (Eds.),
London Math. Soc. Lecture Note Ser., Vol. 134, pp. 153–172.
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