Coulomb plus power-law potentials in quantum mechanics
Abstract
We study the discrete spectrum of the Hamiltonian H = -Delta + V(r) for the Coulomb plus power-law potential V(r)=-1/r+ beta sgn(q)rq, where beta > 0, q > -2 and q 0. We show by envelope theory that the discrete eigenvalues En of H may be approximated by the semiclassical expression En(q) ≈ minr>0\1/r2-1/(mu r)+ sgn(q) beta(nu r)q. Values of mu and nu are prescribed which yield upper and lower bounds. Accurate upper bounds are also obtained by use of a trial function of the form, psi(r)= r+1e-(xr)q. We give detailed results for V(r) = -1/r + beta rq, q = 0.5, 1, 2 for n=1, =0,1,2, along with comparison eigenvalues found by direct numerical methods.
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