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Hulthen potential

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The Hulthen potential [a1] is given by

(a1)

where is the screening parameter and z is a constant which is identified with the atomic number when the potential is used for atomic phenomena.

The Hulthen potential is a short-range potential which behaves like a Coulomb potential for small values of and decreases exponentially for large values of . The Hulthen potential has been used in many branches of physics, such as nuclear physics [a2], atomic physics [a3], [a4], solid state physics [a5], and chemical physics [a6]. The model of the three-dimensional delta-function could well be considered as a Hulthen potential with the radius of the force going down to zero [a7]. The Schrödinger equation for this potential can be solved in a closed form for waves. For , a number of methods have been employed to find approximate solutions for the Schrödinger equation with the Hulthen potential [a8], [a9], [a10], [a11]. The Dirac equation with the Hulthen potential has also been studied using an algebraic approach [a12].

References

[a1] L. Hulthen, Ark. Mat. Astron. Fys , 28A (1942) pp. 5 (Also: 29B, 1)
[a2] L. Hulthen, M. Sugawara, S. Flugge (ed.) , Handbuch der Physik , Springer (1957)
[a3] T. Tietz, J. Chem. Phys. , 35 (1961) pp. 1917
[a4] C.S. Lam, Y.P. Varshni, Phys. Rev. A , 4 (1971) pp. 1875
[a5] A.A. Berezin, Phys. Status. Solidi (b) , 50 (1972) pp. 71
[a6] P. Pyykko, J. Jokisaari, Chem. Phys. , 10 (1975) pp. 293
[a7] A.A. Berezin, Phys. Rev. B , 33 (1986) pp. 2122
[a8] C.S. Lai, W.C. Lin, Phys. Lett. A , 78 (1980) pp. 335
[a9] S.H. Patil, J. Phys. A , 17 (1984) pp. 575
[a10] V.S. Popov, V.M. Wienberg, Phys. Lett. A , 107 (1985) pp. 371
[a11] B. Roy, R. Roychoudhury, J. Phys. A , 20 (1987) pp. 3051
[a12] B. Roy, R. Roychoudhury, J. Phys. A , 23 (1990) pp. 5095
How to Cite This Entry:
Hulthen potential. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Hulthen_potential&oldid=47279
This article was adapted from an original article by R. Roychoudhury (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article