The mathematical theory of resonances whose widths are exponentially small, II
- 1 April 1984
- journal article
- Published by Elsevier in Journal of Mathematical Analysis and Applications
- Vol. 99 (2) , 447-457
- https://doi.org/10.1016/0022-247x(84)90225-7
Abstract
No abstract availableKeywords
This publication has 9 references indexed in Scilit:
- Estimating tunneling phenomenaInternational Journal of Quantum Chemistry, 1982
- Kinetic equation for a weakly coupled test particle. II. Approach to equilibriumPhysical Review A, 1981
- The mathematical theory of resonances whose widths are exponentially smallDuke Mathematical Journal, 1980
- Anharmonic Oscillator. II. A Study of Perturbation Theory in Large OrderPhysical Review D, 1973
- Coupling constant analyticity for the anharmonic oscillatorAnnals of Physics, 1970
- Anharmonic OscillatorPhysical Review B, 1969
- On the asymptotic integration of second order linear ordinary differential equations with polynomial coefficientsJournal of Mathematical Analysis and Applications, 1966
- A Complete Set of Asymptotic Formulas for the Whittaker Function and the LaGuerre PolynomialsJournal of Mathematics and Physics, 1939
- On the Connection Formulas and the Solutions of the Wave EquationPhysical Review B, 1937