Arbitrary 𝓁‐state solutions of the Klein‐Gordon equation with the Pöschl‐Teller potential

Abstract

AbstractWithin the framework of the Klein‐Gordon equation, the relativistic bound states for the Pöschl‐Teller potential are obtained for arbitrary angular momentum quantum numbers by using an approximation for the centrifugal term. The special case for equally scalar and vector Pöschl‐Teller potential is studied. The energy eigenvalues are obtained in closed form and the corresponding normalized radial wave functions are expressed in terms of the generalized hypergeometric functions. The s‐wave (𝓁 = 0) case and bound state conditions are also investigated.