Dynamics of a morse oscillator coupled to a bath of harmonic oscillators

Rcceivcd 8 Scptelnber 1975 l'hc cncrgy levels of a Morse oscillator corresponding to the mound electronic state vibrations of 112 have been calculstcd using a basis ret consisting ofindcpendcntly di~plaxd harmonic oscillator functions. This clack of basic sets provides B WIT cisc dcsaiption of vibra

Laser-induced dissociation of an anharmonic oscillator coupled to a quantum heat bath has been studied. A time-dependent self-consistent field approach has been used in order to solve the time-dependent Schrrdinger equation. The quantum heat bath consists of a set of harmonic oscillators and the dis

Alternative algebraic techniques to approximate a given Hamiltonian by a harmonic oscillator are described both for timeindependent and time-dependent systems. We apply them to the description of a one-dimensional atom-diatom collision. From the resulting evolution operator, we evaluate vibrational

For a quantum harmonic oscillator coupled to the RWA-oscillator, we actually derive Mori's memory kernel equation, which consists of three components, Mori's frequency, Mori's memory function, and Mori's fluctuation. Then we find the method of expressing the three components in terms of an autocorre