Variational approach to the Coulomb problem on a cylinder

Abstract

We evaluate, by means of variational calculations, the bound state energy EB of a pair of charges located on the surface of a cylinder, interacting via Coulomb potential - e2 / r . The trial wave function involves three variational parameters. EB is obtained as a function of the reduced curvature C = a0 / R, where a0 is the Bohr radius and R is the radius of the cylinder. We find that the energetics of binding exhibits a monotonic trend as a function of C ; the known 1D and 2D limits of EB are reproduced accurately by our calculation. EB is relatively insensitive to curvature for small C . Its value is ~ 1% higher at C = 1 than at C = 0. This weak dependence is confirmed by a perturbation theory calculation. The high curvature regime approximates the 1D Coulomb model; within our variational approach, EB has a logarithmic divergence as R approaches zero. The proposed variational method is applied to the case of donors in single-wall carbon nanotubes (SWCNTs).

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