Exact energy quantization condition for single Dirac particle in one-dimensional (scalar) potential well

Abstract

We present an exact quantization condition for the time independent solutions (energy eigenstates) of the one-dimensional Dirac equation with a scalar potential well that gives only two `effective' turning points (defined by the roots of V(x)+mc2= E) for a given energy E and satisfies V(x)+mc2≥ 0. This result generalizes the previously known non-relativistic quantization formula and preserves many physically desirable symmetries, besides, attaining the correct non-relativistic limit. Numerical calculations demonstrate the utility of the formula for computing accurate energy eigenvalues.