Constructions of the Soluble Potentials for the Nonrelativistic Quantum System by Means of the Heun Functions

The Schrödinger equation ψ ′ ′ ( x ) + κ 2 ψ ( x ) = 0 where κ 2 = k 2 - V ( x ) is rewritten as a more popular form of a second order differential equation by taking a similarity transformation ψ ( z ) = ϕ ( z ) u ( z ) with z = z ( x ) . The Schrödinger invariant I S ( x ) can be calculated direct...

Full description

Saved in:
Bibliographic Details
Published in:Advances in high energy physics 2018-01, Vol.2018 (2018), p.1-8
Main Authors: Sun, Guo-Hua, Mejía-García, Concepción, Mercado Sanchez, M. A., Yáñez-Navarro, G., Dong, Shishan, Dong, Shi-Hai
Format: Article
Language:English
Subjects:
Differential equations
Invariants
Mathematical analysis
Ordinary differential equations
Physics
Quantum theory
Schrodinger equation
Transformations (mathematics)
Citations: Items that this one cites
Items that cite this one
Online Access:Get full text
Tags: Add Tag
No Tags, Be the first to tag this record!
Description
Summary:The Schrödinger equation ψ ′ ′ ( x ) + κ 2 ψ ( x ) = 0 where κ 2 = k 2 - V ( x ) is rewritten as a more popular form of a second order differential equation by taking a similarity transformation ψ ( z ) = ϕ ( z ) u ( z ) with z = z ( x ) . The Schrödinger invariant I S ( x ) can be calculated directly by the Schwarzian derivative z , x and the invariant I ( z ) of the differential equation u z z + f ( z ) u z + g ( z ) u = 0 . We find an important relation for a moving particle as ∇ 2 = - I S ( x ) and thus explain the reason why the Schrödinger invariant I S ( x ) keeps constant. As an illustration, we take the typical Heun’s differential equation as an object to construct a class of soluble potentials and generalize the previous results by taking different transformation ρ = z ′ ( x ) as before. We get a more general solution z ( x ) through integrating ( z ′ ) 2 = α 1 z 2 + β 1 z + γ 1 directly and it includes all possibilities for those parameters. Some particular cases are discussed in detail. The results are also compared with those obtained by Bose, Lemieux, Batic, Ishkhanyan, and their coworkers. It should be recognized that a subtle and different choice of the transformation z ( x ) also related to ρ will lead to difficult connections to the results obtained from other different approaches.
ISSN:1687-7357
1687-7365
DOI:10.1155/2018/9824538