On the partition function of the morse oscillator

The second order Wagner-K&wood senuclassical parhtlon function is simply derrved for a generaked one-dimensonal oscdlator. Thermodynamic funtions A. H, E. S. Cy are also given in a simple analytical form. A detailed eomparisun with numerical results for the quark oscillator as example shows very goo

An algebraic approach has been used to treat the linearly forced Morse+xcillator problem. It is shown that the dynamkxl algebra is equivalent to that for the Iif = 2 harmonic+scillator casz. Dissociation probabilities arc calculs;cd using a sudden approximation. They show a strong dependence on init

## Rcceivcd 2 hlay 1983 A group theoretical approach to the one-dimensional Morse oscillator, includ-mg both bound and scatterin\_f states, is presented. It is shown that the group describing the scaatterhxg states, Ufl, l), can be obtained from that describing the bound states. U(2), by analytic

Using quantum algebraic techniques we construct a generalized deformed oscillator giving the Same spectrum as the Morse potential exactly. The generalized deformed bosons used for this purpose behave, up to first order approximation, as the Qbosons already considered in the literature. The relations

The approximate eigenfunctions of the \lorsc oscillator, expressed in terms of Laguorrc polynomials, xc shown to form an approximately ortha\_eonnl basis. Ar!al~~~ic expressions for the matrix elements of common operators are obtained within this representation. With such matrix elements in closed