Calculate Rayleigh - Schrodinger perturbation series for the Barbanis potential

Hamiltonian for this two-dimensional anharmonic oscillator has the form:
H = p_x²/2 + p_y²/2 + w_x² x²/2 + w_y² y²/2 + g^(1/2) x y², where w_x, w_y are frequences of small harmonic normal-mode vibrations, and g is a small perturbation parameter.

The energy is expanded in powers of g:
E(g) = E₀ + E₁ g + ... + E_N g^N, where
      E₀ = (n_x + 1/2)w_x + (n_y + 1/2)w_y is unperturbed harmonic-oscillator energy,
      n_x and n_y are the harmonic oscillator quantum numbers, and
      N is the order of perturbation theory.

Download a text of the Mathematica program that is used for this calculation

19 coefficients for n_x=9, n_y=1, w_x=1, w_y=11/10 in exact form calculated earlier.

4 coefficients for n_x=9, n_y=1, w_x=1 and arbitrary w_y in exact form calculated earlier.

110 coefficients for w_x=1, w_y=1.1, and n_x=0, n_x=0, n_x=0, n_x=1, n_x=0, n_x=2, n_x=0, n_x=4, n_x=1, n_x=0, n_x=1, n_x=2, n_x=2, n_x=0, n_x=2, n_x=1, n_x=2, n_x=2, n_x=3, n_x=0, n_x=3, n_x=1, n_x=4, n_x=0, n_x=5, n_x=0, calculated earlier.

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Designed by A. Sergeev