A Quantum Quasi-Harmonic Nonlinear Oscillator with an Isotonic Term

Abstract

The properties of a nonlinear oscillator with an additional term kg/x2, characterizing the isotonic oscillator, are studied. The nonlinearity affects to both the kinetic term and the potential and combines two nonlinearities associated to two parameters, and kg, in such a way that for =0 all the characteristics of of the standard isotonic system are recovered. The first part is devoted to the classical system and the second part to the quantum system. This is a problem of quantization of a system with position-dependent mass of the form m(x)=1/(1 - x2), with a -dependent non-polynomial rational potential and with an additional isotonic term. The Schr\"odinger equation is exactly solved and the (,kg)-dependent wave functions and bound state energies are explicitly obtained for both <0 and >0.