The biharmonic oscillator and asymmetric linear potentials: from classical trajectories to momentum-space probability densities in the extreme quantum limit

Abstract: The biharmonic oscillator and the asymmetric linear well are two confining power-law-type potentials for which complete bound-state solutions are possible in both classical and quantum mechanics. We examine these problems in detail, beginning with studies of their trajectories in position and momentum space, evaluation of the classical probability densities for both x and p, and calculation of the corresponding quantum-mechanical solutions which give |ψn(x)|2 and |ϕn(p)|2 for comparison to their classical coun… Show more

“…Bi-harmonic oscillator model -We will first consider a bi-harmonic oscillator, which has been previously analysed in [5]. It can be realized in practice as a mass placed (not attached) between two fully relaxed springs A and B of different stiffness constants.…”

Low Frequency Noise in Randomly Stimulated Asymmetric Oscillators

“…Bi-harmonic oscillator model -We will first consider a bi-harmonic oscillator, which has been previously analysed in [5]. It can be realized in practice as a mass placed (not attached) between two fully relaxed springs A and B of different stiffness constants.…”

Low Frequency Noise in Randomly Stimulated Asymmetric Oscillators

The infinite well and Dirac delta function potentials as pedagogical, mathematical and physical models in quantum mechanics