Any l-state solutions of the Schrodinger equation interacting with Hellmann-Kratzer potential model

The approximate analytical solutions of the radial Schrodinger equation have been obtained with a newly proposed potential called Hellmann-Kratzer potential. The potential is a superposition of Hellmann potential and modified Kratzer potential. The Hellmann-Kratzer potential actually comprises of three different potentials which include Yukawa potential, Coulomb potential and Kratzer potential. The aim of combining these potentials is to have a wide application. The energy eigenvalue and the corresponding wave function are calculated in a closed and compact form using the Nikiforov-Uvarov method. The energy equation for some potentials such as Kratzer, Hellmann, Yukawa and Coulomb potentials has also been obtained by varying some potential parameters. Our results excellently agree with the already existing literature. Some numerical results have been computed. We have plotted the behaviour of the energy eigenvalues with different potential parameters and also reported on the numerical result.