The tau method for
the numerical solution of n-dimensional partial differencial
equations
Abstract
The tau method has been successefully used for the numerical
solution of differencial equations in dimensions one and two.
In recent work we have developped an algorithm that generalizes
the formulations of the tau method for ordinary differential
equations and that allows the construction of approximations of
the solution of linear partial differential equations in
n-dimensional rectangular domains. We present several
examples.