An alternative approach to exact wave functions for time-dependent coupled oscillator model of charged particle in variable magnetic field

Maamache, M.; Choi, Jeong Ryeol

doi:10.1016/j.aop.2010.04.011

Cited by 34 publications

(29 citation statements)

References 45 publications

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“…Moreover they are easy to understand, visualize, and implement. More general (mixed) canonical transformations have not been considered in this paper, but they are in principle possible [24][25][26][27][28][29] and will be discussed elsewhere. Generically their physical meaning, definition, and practical use become more involved, so only simplified potential configurations and dynamics are typically worked out explicitly [24][25][26][27][28][29].…”

Section: Discussionmentioning

confidence: 99%

Dynamical normal modes for time-dependent Hamiltonians in two dimensions

2017

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We present the theory of time-dependent point transformations to find independent dynamical normal modes for 2D systems subjected to time-dependent control in the limit of small oscillations. The condition that determines if the independent modes can indeed be defined is identified, and a geometrical analogy is put forward. The results explain and unify recent work to design fast operations on trapped ions, needed to implement a scalable quantum-information architecture: transport, expansions, and the separation of two ions, two-ion phase gates, as well as the rotation of an anisotropic trap for an ion are treated and shown to be analogous to a mechanical system of two masses connected by springs with time dependent stiffness.

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Section: Discussionmentioning

confidence: 99%

Dynamical normal modes for time-dependent Hamiltonians in two dimensions

2017

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“…Recentemente, Menouar et al [3,4] calcularam a função de onda de dois sistemas que descrevem o movimento de uma partícula em um campo magnético variável. Na Ref.…”

Section: Introductionunclassified

“…[3] os autores consideraram o termo de acoplamento estático, xy, enquanto na Ref. [4] eles consideraram o termo de acoplamento dinâmico, p x p y . As soluções encontradas pelos autores foram expressas em termos de uma variável que satisfaz a equação de Milne-Pinney [5,6].…”

Section: Introductionunclassified

Soluções clássicas de sistemas acoplados dependentes do tempo

Lima

Macedo

Guedes

2014

Rev. Bras. Ensino Fís.

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Neste trabalho estudamos um sistema clássico de dois osciladores harmônicos acoplados com massas (mi), constantes de mola (ki) e parâmetro de acoplamento (κ) dependentes do tempo. Para encontrar as soluções das equações de movimento de cada oscilador, usamos uma transformação canônica para reescrever a hamiltoniana do sistema acoplado como a soma das hamiltonianas de dois osciladores harmônicos desacoplados com frequências modificadas e massas unitárias. Analisamos o comportamento de xi, vi =ẋi e do diagrama de fase xi vs. vi para o sistema m1 = m2 = moe γt e k1 = k2 = κ = koe γt . Palavras-chave: osciladores acoplados, transformação canônica.In this work we study a coupled system of two classical oscillators with time-dependent masses (mi), spring constants (ki) and coupling parameter (κ). To obtain the solution of the equation of motion for each oscillator, we use a canonical transformation to rewrite the Hamiltonian of the coupled system as the sum of the hamiltonians of two uncoupled harmonic oscillators with modified frequencies and unitary masses. We analyze the behavior of xi, vi =ẋi and the phase diagram xi vs. vi for the system m1 = m2 = moe γt and k1 = k2 = κ = koe γt

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“…1 The wave functions that satisfy the Schrödinger equation for the time-dependent coupled oscillators have been computed using the methods of unitary transformation and canonical transformation. [2][3][4] Coherent states for a time-dependent Morse oscillator are investigated using the Feinberg-Horodecki quantal equation. 5 Exact solutions of the Schrödinger equation for quantum Dirac field in a time-dependent electric field have also been studied on the basis of the invariant theory.…”

Section: Introductionmentioning

confidence: 99%

Quantization of time-dependent singular potential systems: Non-central potential in three dimensions

Choi

2016

AIP Advances

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Quantum features of a dynamical system subjected to time-dependent non-central potentials are investigated. The entire potential of the system is composed of the inverse quadratic potential and the Coulomb potential. An invariant operator that enables us to treat the time-dependent Hamiltonian system in view of quantum mechanics is introduced in order to derive Schrödinger solutions (wave functions) of the system. To simplify the problem, the invariant operator is transformed to a simple form by unitary transformation. Quantum solutions in the transformed system are easily obtained because the transformed invariant operator is a time-independent simple one. The Nikiforov-Uvarov method is used for solving eigenvalue equation of the transformed invariant operator. The double ring-shaped generalized non-central time-dependent potential is considered as a particular case for further study. From inverse transformation of quantum solutions obtained in the transformed system, the complete quantum solutions in the original system are identified. The quantum properties of the system are addressed on the basis of the wave functions.

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An alternative approach to exact wave functions for time-dependent coupled oscillator model of charged particle in variable magnetic field

Cited by 34 publications

References 45 publications

Dynamical normal modes for time-dependent Hamiltonians in two dimensions

Dynamical normal modes for time-dependent Hamiltonians in two dimensions

Soluções clássicas de sistemas acoplados dependentes do tempo

Quantization of time-dependent singular potential systems: Non-central potential in three dimensions

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