A fully spectral solution method for parabolic equations

This investigation presents a fully spectral method for solving coupled hyperbolic partial differential equations. The spectral method is based on the Galerkin+ollocation technique. Two different preconditioners, the Preissmann and upyind schemes, are evaluated for their performance in solving the d

A convergence proof is given for an abstract parabolic equation using general space decomposition techniques. The space decomposition technique may be a domain decomposition method, a multilevel method, or a multigrid method. It is shown that if the Euler or Crank-Nicolson scheme is used for the par

A fully discrete methodology is investigated from which two-level, explicit, arbitrary-order, conservative numerical schemes for a model parabolic equation can be derived. To illustrate this, fully discrete three-, five-, seven-and nine-point conservative numerical schemes are presented, revealing t

A method for solution of parabohc PDE by means of mterpolahon of the Merentlal operators m two &menslons 1s described The method IS developed on the basis of previously pubhshed methods for solution of ordmary &fferentiaI equations by orthogonal collocation It 1s shown to be highly econonucal and ve