论文信息 - Asymptotically Stable Fourth-Order Accurate Schemes for the Diffusion Equation on Complex Shapes

Asymptotically Stable Fourth-Order Accurate Schemes for the Diffusion Equation on Complex Shapes

An algorithm which solves the multidimensional diffusion equation on complex shapes to fourth-order accuracy and is asymptotically stable in time is presented. Thisbounded-errorresult is achieved by constructing, on arectangular grid,a differentiation matrix whose symmetric part is negative definite. The differentiation matrix accounts for the Dirichlet boundary condition by imposing penalty-like terms. Numerical examples in 2-D show that the method is effective even where standard schemes, stable by traditional definitions, fail. The ability of the paradigm to be applied to arbitrary geometric domains is an important feature of the algorithm.

S. Abarbanel | A. Ditkowski

[1] H. Kreiss,et al. Stability Theory of Difference Approximations for Mixed Initial Boundary Value Problems. II , 1972 .

[2] D. Gottlieb,et al. Time-stable boundary conditions for finite-difference schemes solving hyperbolic systems: methodology and application to high-order compact schemes , 1994 .

[3] B. Strand. Summation by parts for finite difference approximations for d/dx , 1994 .

[4] P. Olsson. Summation by parts, projections, and stability. II , 1995 .

[5] S. Abarbanel,et al. MULTI-DIMENSIONAL ASYMPTOTICALLY STABLE 4th-ORDER ACCURATE SCHEMES FOR THE DIFFUSION EQUATION , 1996 .