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Hamiltonian of the sextic anharmonic oscillator has the form:
H = p2/2 + x2/2 + g x6,
where g is a small perturbation parameter.
The energy is expanded in powers of g:
E(g) = E0 + E1 g + ...
+ EN gN, where
E0 = n + 1/2 is unperturbed harmonic-oscillator energy,
n is the harmonic oscillator quantum number, and
N is the order of perturbation theory.
Download a text of the Mathematica program that is used for this calculation
435 coefficients of the ground-state energy expansion calculated earlier.
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