Exact solution of the 1D Dirac equation for the inverse-square-root potential 1/x
Abstract
We present the exact solution of the 1D Dirac equation for the inverse-square-root potential 1/x for several configurations of vector, pseudo-scalar and scalar fields. Each fundamental solution of the problem can be written as an irreducible linear combination of two Hermite functions of a scaled and shifted argument. We derive the exact equations for bound-state energy eigenvalues and construct accurate approximations for the energy spectrum.
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