Path integral discussion of the improved Tietz potential 1

Abstract

An improved form of the Tietz potential for diatomic molecules is \ discussed in detail within the path integral formalism. The radial Green's function is rigorously constructed in a closed form for different shapes of this potential. For q ≤ 1, and 12α q <r<+∞ , the energy spectrum and the normalized wave functions of the bound states are derived for the l waves. When the deformation parameter q is 0< q <1 or q>0% , it is found that the quantization conditions are transcendental equations that requires numerical solutions. In the limit q→ 0, the energy spectrum and the corresponding wave functions for the radial Morse potential are recovered.