The magnitude of an adiabatic invariant of quantum mechanics

1. M. Born, and V. Fock, Beweis des Adiabatensatzes. Zeitschr. für Physik (1928), 175–180.

2. P. E. Ehrenfest, Adiabatische Invarianten und Quantentheorie. Ann. der Phys. 51 (1916), 327–352.

   Article  Google Scholar 

3. H. Geppert, Theorie der adiabatischen Invarianten allgemeiner Differential- systeme. Math. Ann 102 (1930), 193–243.

   Article  MathSciNet  MATH  Google Scholar 

4. T. Kato, On the adiabatic theorem of Quantum Mechanics. J. of the Phys. Soc. of Japan 5 (1950), 435–439.

   Article  Google Scholar 

5. A. Lenard, Adiabatic invariance to all orders. Ann. of Phys. 6 (1959), 261–276.

   Article  MathSciNet  MATH  Google Scholar 

6. F. Rellich, Störungstheorie der Spektralzerlegung, I. Mitteilung.

7. W. Rudin, Real and Complex Analysis. McGraw-Hill Co., New York, (1966).

   MATH  Google Scholar 

8. Y. Sibuya, Some global properties of matrices of functions of one variable. Math. Ann. 16 (1965), 67–77.

   Article  MathSciNet  MATH  Google Scholar 

9. W. Wasow, Asymptotic Expansions for Ordinary Differential Equations. 2nd ed. Robert E. Krieger Publ. Co., Huntington, New York, N. Y. (1976) (1st ed., Interscience Publishers, New York, 1965).

   MATH  Google Scholar 

10. W. Wasow, Adiabatic invariance of a simple oscillator. SIAM J. Math. Anal. 4 (1973), 153–170.

    Article  MathSciNet  MATH  Google Scholar 

11. W. Wasow, Calculation of an adiabatic invariant by turning point theory. SIAM J. Math. Anal. 5 (1974) 693–700.

    Article  MathSciNet  MATH  Google Scholar 

12. W. Wasow, On the magnitude of an adiabatic invariant in Quantum Mechanics. MRC Technical Summary Report #1345 (1973); Math. Research Ctr., Univ. of Wisconsin-Madison.

13. W. Wasow, Some recent results in the theory of adiabatic invariants. International Conference on Differential Equations, edited by H. A. Antosiewicz. Academic Press, Inc. New York (1975), pp. 747–764.

    Chapter  Google Scholar 

Download references