Levinson's theorem
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Levinson's theorem is an important theorem in non-relativistic quantum scattering theory. It relates the number of bound states of a potential to the difference in phase of a scattered wave at zero and infinite energies. It was published by Norman Levinson in 1949.[1]
Statement of theorem
[edit]The difference in the -wave phase shift of a scattered wave at zero energy, , and infinite energy, , for a spherically symmetric potential is related to the number of bound states by:
where or . The case is exceptional and it can only happen in -wave scattering. The following conditions are sufficient to guarantee the theorem:[2]
- continuous in except for a finite number of finite discontinuities
References
[edit]- ^ Levinson's Theorem
- ^ A. Galindo and P. Pascual, Quantum Mechanics II (Springer-Verlag, Berlin, Germany, 1990).
External links
[edit]- M. Wellner, "Levinson's Theorem (an Elementary Derivation," Atomic Energy Research Establishment, Harwell, England. March 1964.