J. R. Burgan scite author profile

A Schrödinger equation for a well potential with varying width is studied. Generalized canonical transformations are shown to transform the problem into a time-dependent harmonic oscillator problem submitted to fixed boundary conditions. This transformed problem is solved by a perturbation technique and gives the evolution of the average energy of the system according to the motion of the well. Motions corresponding to a renormalization or compaction group are shown to be solvable by separation of variables.

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Group Transformations and the Nonlinear Heat Diffusion Equation

Munier¹,

Burgan²,

Gutiérrez³

et al. 1981

SIAM J. Appl. Math.

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Self-similar and asymptotic solutions for a one-dimensional Vlasov beam

et al. 1983

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Solution of the multidimensional quantum harmonic oscillator with time-dependent frequencies through Fourier, Hermite and Wigner transforms

et al. 1979

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J. R. Burgan

Schrödinger equation with time-dependent boundary conditions

Group Transformations and the Nonlinear Heat Diffusion Equation

Self-similar and asymptotic solutions for a one-dimensional Vlasov beam

Solution of the multidimensional quantum harmonic oscillator with time-dependent frequencies through Fourier, Hermite and Wigner transforms

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