Dissociation Energy and Long‐Range Potential of Diatomic Molecules from Vibrational Spacings of Higher Levels

An expression is derived which relates the distribution of vibrational levels near the dissociation limit D of a given diatomic species to the nature of the long‐range interatomic potential, in the region where the latter may be approximated by D − Cn / Rn. Fitting experimental energies directly to this relationship yields values of D, n, and Cn. This procedure requires a knowledge of the relative energies and relative vibrational numbering for at least four rotationless levels lying near the dissociation limit. However, it requires no information on the rotational constants or on the number and energies of the deeply bound levels. D can be evaluated with a much smaller uncertainty than heretofore obtainable from Birge–Sponer extrapolations. The formula predicts the energies of all vibrational levels lying above the highest one measured, with uncertainties no larger than that of the binding energy of the highest level. The validity of the method is tested with model potentials, and its usefulness is demon...

[1]  R. Leroy Spectroscopic reassignment and ground-state dissociation energy of molecular iodine , 1970 .

[2]  John A. Horsley,et al.  Les forces interatomiques à grandes distances dans les états excités du radical OH , 1969 .

[3]  C. Fischer Numerical Hartree–Fock results for the atoms helium to radon , 1968 .

[4]  J. Cashion Simple Formulas for the Vibrational and Rotational Eigenvalues of the Lennard‐Jones 12‐6 Potential , 1968 .

[5]  T. Y. Chang Long-range interatomic forces , 1967 .

[6]  W. Richards,et al.  Complete potential energy curves for excited states of chlorine and bromine , 1967 .

[7]  W. Richards,et al.  Long-range interatomic forces from spectroscopic data , 1967 .

[8]  R. Bernstein Long-range interatomic forces from predissociation data and resonances in atomic scattering. , 1966 .

[9]  Irene A. Stegun,et al.  Handbook of Mathematical Functions. , 1966 .

[10]  J. K. Cashion,et al.  Testing of Diatomic Potential‐Energy Functions by Numerical Methods , 1963 .

[11]  A. Douglas,et al.  THE ABSORPTION SPECTRUM OF 35Cl2 FROM 4780 TO 6000 Å , 1963 .

[12]  C. L. Beckel Vibrational Analysis of the Heitler—London Potential of H2 , 1963 .

[13]  Joseph O. Hirschfelder,et al.  Contribution of Bound, Metastable, and Free Molecules to the Second Virial Coefficient and Some Properties of Double Molecules , 1959 .

[14]  C. F. Curtiss,et al.  Molecular Theory Of Gases And Liquids , 1954 .

[15]  D. F. Hays,et al.  Table of Integrals, Series, and Products , 1966 .

[16]  J. V. Vleck,et al.  Dipole-Dipole Resonance Forces , 1939 .

[17]  H. Margenau Van der waals forces , 1939 .

[18]  P. Morse,et al.  Methods of theoretical physics , 1955 .

[19]  Rudolph E. Langer,et al.  On the Connection Formulas and the Solutions of the Wave Equation , 1937 .

[20]  R. T. Birge The determination of heats of dissociation by means of band spectra , 1929 .

[21]  R. T. Birge,et al.  The Heat of Dissociation of Non-Polar Molecules , 1926 .