Open AccessSolution of Schrodinger equation in the presence of minimal length for cotangent hyperbolic potential using hypergeometric method
Author(s) -
Fathoni Nur Hidayat,
A. Супармі,
C. Cari
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/578/1/012095
Subject(s) - hypergeometric function , schrödinger equation , trigonometric functions , matlab , mathematics , mathematical analysis , hyperbolic function , function (biology) , hypergeometric distribution , energy (signal processing) , software , physics , quantum mechanics , geometry , pure mathematics , computer science , evolutionary biology , biology , operating system , programming language
This study was proposed to get the solution of the Schrodinger equation with cotangent hyperbolic potential in the presence of minimal length by using the hypergeometric method. By getting the numerical results with the help of Octave software, we can analyze nonrelativistic energy. The visualization of wave function was obtained using Matlab software. The result is defined as the larger of minimal length, the width of potential V 1 , and the angular momentum was included, the energy is increasing as well. The larger of the width of potential V0 affected the decrease of energy in this system.