Open AccessAlternative solution of the bohr-mottelson equation in minimal length effect for cotangent potential using the hypergeometric method
Author(s) -
A. Супармі,
Siti Fatimah,
C. Cari,
Isnaini Lilis Elviyanti
Publication year - 2019
Publication title -
iop conference series. materials science and engineering
Language(s) - English
Resource type - Journals
eISSN - 1757-899X
pISSN - 1757-8981
DOI - 10.1088/1757-899x/578/1/012090
Subject(s) - bohr model , hypergeometric function , mathematics , mathematical analysis , hypergeometric distribution , trigonometric functions , function (biology) , wave function , spectrum (functional analysis) , mathematical physics , quantum mechanics , physics , geometry , pure mathematics , evolutionary biology , biology
The rigid deformed nucleus of minimal length effect is investigated using the Bohr-Mottelson equation that influenced by Cotangent potential. The Bohr-Mottelson equation of minimal length effect is solved by Hypergeometric method to obtain the energy spectrum and wave function. The energy spectrum is calculated by using Matlab software. The wave function is expressed in the Hypergeometric term. The result shown that, the energy spectrum is increased caused existence of minimal length effect.