2008
DOI: 10.1002/qua.21905
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Study of a confined hydrogen‐like atom by the asymptotic iteration method

Abstract: Abstract. The asymptotic iteration method (AIM) is used to obtain both special exact solutions and general approximate solutions for a Hydrogen-like atom confined in a spherical box of arbitrary radius R. Critical box radii, at which states are no longer bound, are also calculated. The results are compared with those in the literature.

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Cited by 27 publications
(48 citation statements)
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“…For all values of radii, present energies for both states completely agree with the quoted values, for up to the precision they are presented in . Some other very accurate results are also found, for example, the series method asymptotic iteration method . Former results exist for both states, while same for the latter offers only 2 s states.…”
Section: Resultssupporting
confidence: 82%
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“…For all values of radii, present energies for both states completely agree with the quoted values, for up to the precision they are presented in . Some other very accurate results are also found, for example, the series method asymptotic iteration method . Former results exist for both states, while same for the latter offers only 2 s states.…”
Section: Resultssupporting
confidence: 82%
“…[34] Some other very accurate results are also found, for example, the series method [33] asymptotic iteration method. [32] Former results exist for both states, while same for the latter offers only 2s states. For all instances, our energies are seen to either agree completely with these, or differ only in the last place of decimal quoted.…”
Section: Resultsmentioning
confidence: 86%
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“…Effect of compression on energy levels of ground and excited states, as well as other properties like hyperfine splitting constant, dipole shielding factor, nuclear magnetic screening constant, pressure, static, and dynamic polarizability, were examined . Numerous theoretical methods varying in complexity, sophistication were employed; a selected set includes perturbation theory, Padé approximation, WKB method, Hypervirial theorem, power‐series solution, super‐symmetric quantum mechanics, Lie algebra, Lagrange‐mesh method, asymptotic iteration method, generalized pseudo‐spectral method, and so forth and references therein. Exact solutions are expressible in terms of Kummer M‐function (confluent hypergeometric).…”
Section: Introductionmentioning
confidence: 99%
“…For such cases, there are some analytical and numerical approximation methods such as 1/ expansion (Bag, Panja, & Dutt, 1992), supersymmetry (Morales, 2004), Pekeris approximation (Pekeris, 1934), variational methods (Montgomery, 2001(Montgomery, , 2011, and asymptotic iteration methods (Ciftci, Hall, & Saad, 2009) to obtain the energy eigenvalues and eigenfunctions with this type of boundary conditions. Another technique used to find exact solutions of quantum systems is the Nikiforov-Uvarov method (Nikiforov & Uvarov, 1988;Szego, 1975), which is now used often but for non confined systems by many authors.For detailed applications and applicability of the Nikiforov-Uvarov method in quantum mechanics, the reader may refer to (Berkdemir, 2012).…”
Section: Introductionmentioning
confidence: 99%