Analytic expression of the rotation harmonics in the vibration–rotation wave function of a diatomic molecule

## Abstract A solution of the wave equation for the rotational–vibrational motion in diatomic molecules with a new exponential potential function is carried out in detail. The solution gives simple expressions for the wave functions, eigenenergies, and other related spectroscopic constants. With th

The problem of the determination of the vibration-rotation eigenvalue in diatomic molecules is considered. An eigenvalue equation totally independent from the eigenfunction is written for any potential, analytical or numerical. This equation uses uniquely the vibration-rotation canonical functions;

The inductive properties of a non-polar diatomic molecule in a static non-uniform electric field are best described in terms of its dipole polarizability (a), second hyperpolarizability (y), quadrupole-quadrupole polarizability (C) and dipole-dipole-quadrupole polarizability (B). We present formulae

## Abstract A solution of the wave equation for the nuclear motion of a diatomic molecule with an exponential potential function and the rotational term included has been performed by the Schrödinger‐Infeld‐Hull factorization method. Two different procedures have been followed for the factorization