A basis for variational calculations in d dimensions
Abstract
In this paper we derive expressions for matrix elements (φi,Hφj) for the Hamiltonian H=-+Σq a(q)rq in d > 1 dimensions. The basis functions in each angular momentum subspace are of the form phii(r)=ri+1+(t-d)/2e-rp/2, i >= 0, p > 0, t > 0. The matrix elements are given in terms of the Gamma function for all d. The significance of the parameters t and p and scale s are discussed. Applications to a variety of potentials are presented, including potentials with singular repulsive terms of the form b/ra, a,b > 0, perturbed Coulomb potentials -D/r + B r + Ar2, and potentials with weak repulsive terms, such as -g r2 + r4, g > 0.
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