EXACT SOLUTIONS OF FEINBERG-HORODECKI EQUATION FOR TIME-DEPENDENT TIETZ-WEI DIATOMIC MOLECULAR POTENTIAL

The Tietz-Wei diatomic molecular potential was proposed as an inter-molecular potential and is considered as one of the best potential models that describes the vibrational energy of a diatomic molecules [1-3]. Various solutions of the wave equation with this potential have been obtained by many authors. For example, Falaye et al. [3] obtained Fisher's information entropy of the TietzWei diatomic molecular model and Sun and Dong [4] presented bound state solutions of the relativistic Klein-Gordon equation with Tietz-Wei diatomic molecular potential. It is understood that there is no report of Teitz-Wei diatomic molecular potential with the Feinberg-Horodecki equation to the best of our knowledge. In this work, we examine the exact solution of the FeinbergHorodecki equation for time-dependent Tietz-Wei diatomic molecular potential in the framework of super-symmetric quantum mechanics. The Feinberg-Horodecki time-dependent Schrodingerlike equation [5, 6] is given as