Energy bounds for the spinless Salpeter equation
Abstract
We study the spectrum of the spinless-Salpeter Hamiltonian H = β m2 + p2 + V(r), where V(r) is an attractive central potential in three dimensions. If V(r) is a convex transformation of the Coulomb potential -1/r and a concave transformation of the harmonic-oscillator potential r2, then upper and lower bounds on the discrete eigenvalues of H can be constructed, which may all be expressed in the form E = minr>0 [ β m2 + P2/r2 + V(r) ] for suitable values of P here provided. At the critical point the relative growth to the Coulomb potential h(r)=-1/r must be bounded by dV/dh < 2β/π.
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