TRANSITIONS TO CHAOS IN TWO-DIMENSIONAL DOUBLE-DIFFUSIVE CONVECTION.

The partial differential equations governing two-dimensional thermosolutal convection in a Boussinesq fluid with free boundary conditions have been solved numerically in a regime where oscillatory solutions can be found. A systematic study of the transition from nonlinear periodic oscillations to temporal chaos has revealed sequences of period-doubling bifurcations. Solutions have been obtained for two representative values of thermal diffusivity tau . A detailed investigation of successive bifurcations along the branch of oscillatory solutions is carried out. Finally, the development of chaos on the oscillatory branch as R//s is explored. Refs.