Multidomain pseudospectral methods for nonlinear convection-diffusion equations

The method of lines provides a ¯exible and general approach for solving time-dependent PDEs. However, the numerical solution of the resulting ODE system can present certain diculties depending on the method used. In particular, oscillations may appear in the solution when standard methods are applie

Difference methods for solving the convection-diffusion equation are discussed. The superiority of Allen's approximation over central or upwind differences for one-dimensional problems is confirmed, the superiority being greatest when the boundary layer is very thin. Higher order methods give improv

We indicate by ͳD [Ͱ,ͱ] ϭ D [Ͱ] ʝ D [ͱ] the internal boundary between the Ͱth and the ͱth subdomain. This partition A multidomain pseudospectral method, which is based on Chebyshev polynomials expansions, is presented to solve an initialmust be such that any quantity remains of C ȍ -class in each bo