Reconsidering the model of two coupled harmonic oscillators

For description of the model and comparison of partition of energy between x and y modes (quantum versus phase-space) see pdf-file.

Revising figures

Fig. 1
Results
Initial wave function Final wave function for n = 2 Final wave function for n = 6 Final wave function for n = 12 Final wave function for n = 20 Final wave function for n = 30 Animate
Fig. 2
Results
Initial wave function Final wave function for n = 2 Final wave function for n = 6 Final wave function for n = 12 Final wave function for n = 20 Final wave function for n = 30 Animate
Fig. 3
Results
Initial wave function Final wave function for n = 2 Final wave function for n = 6 Final wave function for n = 12 Final wave function for n = 20 Final wave function for n = 30 Animate
Fig. 4
Results
Initial wave function Final wave function for n = 2 Final wave function for n = 6 Final wave function for n = 12 Final wave function for n = 20 Final wave function for n = 30 Animate
Fig. 5
Results
Initial wave function Final wave function for n = 2 Final wave function for n = 6 Final wave function for n = 12 Final wave function for n = 20 Final wave function for n = 30 Animate
Fig. 6
Results
Initial wave function Final wave function for n = 2 Final wave function for n = 6 Final wave function for n = 12 Final wave function for n = 20 Final wave function for n = 30 Animate

New patterns

Square pattern


Square pattern
Final wave function for n = 50 Animate
Worst prediction of Rx


Worst prediction
Final wave function for n = 50 Animate

Mathematica program for printing figures of the final wave function.

Mathematica program for printing tables.

Subroutine to find the point of minimum in a phase space for oscillators.

Figures for anisotropic oscillators with frequencies 1:2.


Back to Results of work at BGU with B. Segev

More Unpublished reports

Designed by A. Sergeev.