J Austral Math Soc Ser B 34 pp174--198, 1992.
(Received 25 July 1990; revised 31 May 1991)
The new motion of embedding a centre manifold in some higher-dimensional manifold leads to a practical approach to the rational low-dimensional approximation of a wide class of dynamical systems; it also provides a simple geometric picture for these approximations. In particular, I consider the problem of finding an approximate, but accurate, description of the evolution of a two-dimensional planfonn of convection. Inspired by a simple example, the straightforward adiabatic iteration is proposed to estimate an embedding manifold and arguments are presented for its effectiveness. Upon applying the procedure to a model convective planfonn problem I find that the resulting approximations perform remarkably well-—much better than the traditional Swift-Hohenberg approximation for planfonn evolution.
Last Modified: Mon Jan 7 16:47:47 2002