Surarit Pepore scite author profile

Surarit Pepore

5Publications

12Citation Statements Received

73Citation Statements Given

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Rajamangala University of Technology

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Untitled

Pepore¹,

Winotai²,

Osotchan³

et al. 2006

ScienceAsia

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The exact solutions to the time-dependent Schrodinger equation for a harmonic oscillator with time-dependent mass and frequency were derived in a general form. The quantum mechanical propagator was calculated by the Feynman path integral method, while the wave function was derived from the spectral representation of the obtained propagator. It was shown that the propagator and the wave function depended on the s solution of a classical oscillator, in which the amplitude and phase satisfied the auxiliary equations. To demonstrate the derivation of the solution from our auxiliary equations, exponential and periodic functions of mass with constant frequency were imposed to evaluate the propagator and wave function for the Caldirola-Kanai and pulsating mass oscillators, respectively.

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Integrals of the motion and green functions for time-dependent mass harmonic oscillators

Pepore

2018

Rev. Mex. Fís.

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The application of the integrals of the motion of a quantum system in deriving Green function or propagator is established. The Greenfunction is shown to be the eigenfunction of the integrals of the motion which described initial points of the system trajectory in the phasespace. The explicit expressions for the Green functions of the damped harmonic oscillator, the harmonic oscillator with strongly pulsatingmass, and the harmonic oscillator with mass growing with time are obtained in co-ordinate representations. The connection between theintegrals of the motion method and other method such as Feynman path integral and Schwinger method are also discussed.

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Integrals of the motion and Green function for dual damped oscillators and coupled harmonic oscillators

Pepore

2018

Rev. Mex. Fís.

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The application for the integrals of the motion of a quantum system in deriving Green function or propagator is presented. The Green function is shown to be the eigenfunction of the integrals of the motion which described initial points of the system trajectory in the phase space. The exact expressions for the Green functions of the dual damped oscillators and the coupled harmonic oscillators are evaluated in co-ordinate representations. The relation between the integrals of the motion method and other methods such as Feynman path integral and Schwinger method are also presented.

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Propagators for a Damped Harmonic Oscillator with Time-Dependent Mass and Frequency and a Time-Dependent Inverted Harmonic Oscillator

Thongpool¹,

Pepore²

2022

SSRN Journal

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The Propagator of the Inverted Caldirola-Kanai Oscillator

Pepore

2022

SSRN Journal

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Surarit Pepore

Untitled

Integrals of the motion and green functions for time-dependent mass harmonic oscillators

Integrals of the motion and Green function for dual damped oscillators and coupled harmonic oscillators

Propagators for a Damped Harmonic Oscillator with Time-Dependent Mass and Frequency and a Time-Dependent Inverted Harmonic Oscillator

The Propagator of the Inverted Caldirola-Kanai Oscillator

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