99-141 Bambusi, D.

ON THE DYNAMICS OF THE HOLSTEIN MODEL FROM THE ANTICONTINUOUS LIMIT (154K, PS) May 6, 99

Abstract , Paper (src), View paper (auto. generated ps), Index of related papers

Abstract. We consider the Holstein model describing an electron interacting with a lattice of identical oscillators. We remark that the on site system (i.e. the system in which the interaction between the different sites of the lattice vanishes) is integrable and anisocronous. This allows to apply some recent Nekhoroshev type results to show that corresponding the majority of initial data in which the electron probability is concentrate on a finite number of sites, the electron probability distribution is approximatively constant for times growing exponentially with the inverse of the coupling parameter. Moreover, for the same times, the total energy of the oscillator system is approximatively constant.

Files: 99-141.src( desc , 99-141.ps )