Exact Solutions of Schrodinger Equation for the Position-Dependent Effective Mass Harmonic Oscillator

被引:32
作者
Amir, Naila [1 ]
Iqbal, Shahid [1 ]
机构
[1] Natl Univ Sci Technol, Sch Nat Sci, Islamabad, Pakistan
来源
COMMUNICATIONS IN THEORETICAL PHYSICS | 2014年 / 62卷 / 06期
关键词
nonlinear harmonic oscillator; position-dependent effective mass system; Schrodinger equation modified Hermite polynomials; WAVE-PACKET REVIVAL; SUPERSYMMETRIC APPROACH; ALGEBRAIC APPROACH; SERIES SOLUTIONS; QUANTUM-SYSTEMS; STATES; HETEROSTRUCTURES; POTENTIALS; GENERATION; PARTICLES;
D O I
10.1088/0253-6102/62/6/03
中图分类号
O4 [物理学];
学科分类号
0702 ;
摘要
A one-dimensional harmonic oscillator with position-dependent effective mass is studied. We quantize the oscillator to obtain a quantum Hamiltonian, which is manifestly Hermitian in configuration space, and the exact solutions to the corresponding Schrodinger equation are obtained analytically in terms of modified Hermite polynomials. It is shown that the obtained solutions reduce to those of simple harmonic oscillator as the position dependence of the mass vanishes.
引用
收藏
页码:790 / 794
页数:5
相关论文
共 87 条
[1]   Effective mass Schrodinger equation for exactly solvable class of one-dimensional potentials [J].
Aktas, Metin ;
Sever, Ramazan .
JOURNAL OF MATHEMATICAL CHEMISTRY, 2008, 43 (01) :92-100
[2]  
Alhaidari A.D., CONDMAT0303537
[3]  
Alhaidari A.D., MATHPH0310030
[4]  
Alhaidari AD, 2002, PHYS REV A, V66, DOI 10.1103/PhysRevA.66.042116
[5]   Nonrelativistic Green's function for systems with position-dependent mass [J].
Alhaidari, AD .
INTERNATIONAL JOURNAL OF THEORETICAL PHYSICS, 2003, 42 (12) :2999-3009
[6]   DYNAMIC SYMMETRIES IN SCATTERING [J].
ALHASSID, Y ;
IACHELLO, F ;
WU, J .
PHYSICAL REVIEW LETTERS, 1986, 56 (04) :271-273
[7]   RESONANCE WIDTHS AND POSITIONS BY AN ALGEBRAIC APPROACH [J].
ALHASSID, Y ;
IACHELLO, F ;
LEVINE, RD .
PHYSICAL REVIEW LETTERS, 1985, 54 (16) :1746-1749
[8]   EXISTENCE OF INFINITELY MANY ZERO-ENERGY STATES IN A MODEL OF SUPERSYMMETRIC QUANTUM-MECHANICS [J].
ARAI, A .
JOURNAL OF MATHEMATICAL PHYSICS, 1989, 30 (05) :1164-1170
[9]   Approximate analytical solutions of the Klein-Gordon equation for the Hulthen potential with the position-dependent mass [J].
Arda, Altug ;
Sever, Ramazan ;
Tezcan, Cevdet .
PHYSICA SCRIPTA, 2009, 79 (01)
[10]   Deformed shape invariance and exactly solvable Hamiltonians with position-dependent effective mass [J].
Bagchi, B ;
Banerjee, A ;
Quesne, C ;
Tkachuk, VM .
JOURNAL OF PHYSICS A-MATHEMATICAL AND GENERAL, 2005, 38 (13) :2929-2945
123456789