Lower-bound energies and the Virial theorem in wave mechanics

G. L. Caldow; C. A. Coulson

doi:10.1017/S0305004100035283

Abstract

Several forms of the lower-bound variational method for the calculation of the eigenvalues in a wave-mechanical problem are considered, and compared; the particular case of the harmonic oscillator being chosen. All forms have certain unsatisfactory features, but some of them are considerably worse than others. One reason why calculations of lower bounds are in general less satisfactory than Ritz-type calculations of an upper bound is shown to be that whereas, in the presence of a scale factor, this latter wave-function satisfies the virial theorem, in none of the lower-bound wave-functions is this true. Similar calculations are reported for the ground state of the helium atom.

References

REFERENCES

(1)Temple, G., Proc. Roy. Soc. A, 119 (1928), 276.Google Scholar

(2)Kato, T., J. Phys. Soc. Japan, 4 (1948), 334.CrossRef Google Scholar

(3)Weinstein, A., Proc. Nat. Acad. Sci., Wash., 20 (1934), 529.CrossRef Google Scholar

(4)Stevenson, A. F., Phys. Rev. 53 (1938), 199.Google Scholar

(5)Stevenson, A. F., and Crawford, M. F., Phys. Rev. 54 (1938), 375.CrossRef Google Scholar

(6)Gould, S.H., Variational methods for eigenvalue problems (Toronto, 1957).Google Scholar

(7)Bazley, N. W., Proc. Nat. Acad. Sci., Wash., 45 (1959), 850.CrossRef Google Scholar

(8)Kinoshita, T., Phys. Rev. 105 (1957), 1490.CrossRef Google Scholar

(9)Kinoshita, T., Phys. Rev. 115 (1959), 366.CrossRef Google Scholar

(10)Kauzmann, W., Quantum chemistry, p. 229. (New York, 1957).Google Scholar

(11)Coulson, C. A., and Bell, R. P., Trans. Faraday Soc. 41 (1945), 141.CrossRef Google Scholar

(12)Fock, V., Z. Phys. 63 (1930), 855.Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Pekeris, C. L. 1962. 1S1,2S1, and2S3States ofH−and of He. Physical Review, Vol. 126, Issue. 4, p. 1470.

Preuss, H. 1962. Die Güte von Näherungslösungen der Schrödingergleichung und die Genauigkeit der Erwartungswerte und Übergangselemente. Fortschritte der Physik, Vol. 10, Issue. 6, p. 271.

Rédei, L. B. 1963. Limits of Error for the Electron Density, Spin Density, and Atomic Form Factor in Quantum-Mechanical Calculations. Physical Review, Vol. 130, Issue. 1, p. 420.

Hall, George G. 1963. Statistical Theory of the Error in Approximate Wavefunctions. The Journal of Chemical Physics, Vol. 38, Issue. 5, p. 1104.

Herndon, R. C. Tang, Y. C. and Schmid, E. W. 1964. An analysis of the hypertriton. Il Nuovo Cimento, Vol. 33, Issue. 1, p. 259.

Conroy, Harold 1964. Molecular Schrödinger Equation. III. Calculation of Ground-State Energies by Extrapolation. The Journal of Chemical Physics, Vol. 41, Issue. 5, p. 1336.

Johnson, B P and Coulson, C A 1964. Lower bounds for the energy of H2+. Proceedings of the Physical Society, Vol. 84, Issue. 2, p. 263.

Tang, Y. C. Herndon, R. C. and Schmid, E. W. 1964. Upper and Lower Bound of the Eigenvalue of a Three-Body System. Physical Review, Vol. 134, Issue. 4B, p. B743.

Löwdin, Per-Olov 1965. Studies in Perturbation Theory. X. Lower Bounds to Energy Eigenvalues in Perturbation-Theory Ground State. Physical Review, Vol. 139, Issue. 2A, p. A357.

Walmsley, Mary and Coulson, C. A. 1966. Lower bound energy calculations for . Mathematical Proceedings of the Cambridge Philosophical Society, Vol. 62, Issue. 4, p. 769.

Schwartz, M E 1967. Lower bounds to energies for Gaussian wave functions: studies of the hydrogen-atom ground state. Proceedings of the Physical Society, Vol. 90, Issue. 1, p. 51.

Mazziotti, Alexander 1969. Lower Bounds and Estimation of Energy Eigenvalues in a Gaussian Basis. The Journal of Chemical Physics, Vol. 51, Issue. 9, p. 4013.

Mazziotti, Alexander 1969. Lower Bounds to Energy Eigenvalues. The Journal of Chemical Physics, Vol. 50, Issue. 8, p. 3339.

Brändas, E. and Goscinski, O. 1969. Symmetry-Adapted Second-Order Energy. Some Comments and Results for H2+. The Journal of Chemical Physics, Vol. 51, Issue. 3, p. 975.

Keaveny, Ian T. and Christoffersen, Ralph E. 1969. Calculation of Lower Bounds to Energies of Molecular Systems. I. Mathematical Methods and Energy Variances for Simple Systems. The Journal of Chemical Physics, Vol. 50, Issue. 1, p. 80.

Weinhold, F. 1972. Advances in Quantum Chemistry Volume 6. Vol. 6, Issue. , p. 299.

Coulson, C A and Haskins, P J 1973. On the relative accuracies of eigenvalue bounds. Journal of Physics B: Atomic and Molecular Physics, Vol. 6, Issue. 9, p. 1741.

Johnson, J. W. and Poshusta, R. D. 1973. Gaussian orbitals optimized for lower bounds of hydrogenic atoms. International Journal of Quantum Chemistry, Vol. 7, Issue. 5, p. 951.

Coulson, C A and Walmsley, M 1974. Studies in the accuracy of some lower-bound formulae-a simple one-dimensional problem. Journal of Physics B: Atomic and Molecular Physics, Vol. 7, Issue. 11, p. 1225.

Mucci, J. F. 1979. On the mathematical form of «intermediate–operators» as applied to the hypervirial theorem. Lettere al Nuovo Cimento, Vol. 24, Issue. 13, p. 468.

Download full list

Article contents

Lower-bound energies and the Virial theorem in wave mechanics

Abstract

Access options

References

REFERENCES

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Article contents

Lower-bound energies and the Virial theorem in wave mechanics

Abstract

Access options

References

REFERENCES

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests