The Application of Minimal Length in Klein-Gordon Equation with Hulthen Potential Using Asymptotic Iteration Method
Joint Authors
Suparmi, A.
Cari, Cari
Elviyanti, Isnaini Lilis
Pratiwi, Beta Nur
Source
Advances in Mathematical Physics
Issue
Vol. 2018, Issue 2018 (31 Dec. 2018), pp.1-8, 8 p.
Publisher
Hindawi Publishing Corporation
Publication Date
2018-07-02
Country of Publication
Egypt
No. of Pages
8
Main Subjects
Abstract EN
The application of minimal length formalism in Klein-Gordon equation with Hulthen potential was studied in the case of scalar potential that was equal to vector potential.
The approximate solution was used to solve the Klein-Gordon equation within the minimal length formalism.
The relativistic energy and wave functions of Klein-Gordon equation were obtained by using the Asymptotic Iteration Method.
By using the Matlab software, the relativistic energies were calculated numerically.
The unnormalized wave functions were expressed in hypergeometric terms.
The results showed the relativistic energy increased by the increase of the minimal length parameter.
The unnormalized wave function amplitude increased for the larger minimal length parameter.
American Psychological Association (APA)
Elviyanti, Isnaini Lilis& Pratiwi, Beta Nur& Suparmi, A.& Cari, Cari. 2018. The Application of Minimal Length in Klein-Gordon Equation with Hulthen Potential Using Asymptotic Iteration Method. Advances in Mathematical Physics،Vol. 2018, no. 2018, pp.1-8.
https://search.emarefa.net/detail/BIM-1119351
Modern Language Association (MLA)
Elviyanti, Isnaini Lilis…[et al.]. The Application of Minimal Length in Klein-Gordon Equation with Hulthen Potential Using Asymptotic Iteration Method. Advances in Mathematical Physics No. 2018 (2018), pp.1-8.
https://search.emarefa.net/detail/BIM-1119351
American Medical Association (AMA)
Elviyanti, Isnaini Lilis& Pratiwi, Beta Nur& Suparmi, A.& Cari, Cari. The Application of Minimal Length in Klein-Gordon Equation with Hulthen Potential Using Asymptotic Iteration Method. Advances in Mathematical Physics. 2018. Vol. 2018, no. 2018, pp.1-8.
https://search.emarefa.net/detail/BIM-1119351
Data Type
Journal Articles
Language
English
Notes
Includes bibliographical references
Record ID
BIM-1119351