Convergence and non-convergence to Bose-Einstein condensation

Abstract

The paper is a continuation of our previous work on the strong convergence to equilibrium for the spatially homogeneous Boltzmann equation for Bose-Einstein particles for isotropic solutions at low temperature. Here we study the influence of the particle interaction potentials on the convergence to Bose-Einstein condensation (BEC). Consider two cases of certain potentials that are such that the corresponding scattering cross sections are bounded and 1) have a lower bound const.\1, | v-v*|2η\ with const.>0, 0 η<1, and 2) have an upper bound const.\1, | v-v*|2η\ with η 1. For the first case, the long time convergence to BEC i.e. t∞Ft(\0\)=F be(\0\) is proved for a class of initial data having very low temperature and thus it holds the strong convergence to equilibrium. For the second case we show that if initially F0(\0\)=0, then Ft(\0\)=0 for all t 0 and thus there is no convergence to BEC hence no strong convergence to equilibrium.