Approximate Solutions, Thermal Properties, and Superstatistics Solutions to Schrödinger Equation

In this work, we apply the parametric Nikiforov-Uvarov method to obtain eigensolutions and total normalized wave function of Schrödinger equation expressed in terms Jacobi polynomial using Coulomb plus Screened Exponential Hyperbolic Potential (CPSEHP), where obtained probability density plots for proposed potential various orbital angular quantum number, as well some special cases (Hellmann Yukawa potential). The is best suitable smaller values screening parameter α . resulting energy eigenvalue presented a close form extended study thermal properties superstatistics partition id="M2"> Z other thermodynamic such vibrational mean id="M3"> U , specific heat capacity id="M4"> C entropy id="M5"> S free id="M6"> F Using with help Matlab software, numerical bound state solutions were ( id="M7"> ) different expectation via Hellmann-Feynman Theorem (HFT). trend both excellent agreement existing literatures. Due analytical mathematical complexities, evaluated Mathematica 10.0 version software. model reduces Hellmann potential, cases.