LOCAL COMPATIBILITY BOUNDARY CONDITIONS FOR HIGH-ORDER ACCURATE FINITE-DIFFERENCE APPROXIMATIONS OF PDEs.

We describe a new approach to derive numerical approximations of boundary conditions for high-order accurate finite-difference approximations. The approach, called the local compatibility boundary condition (LCBC) method, uses boundary conditions and compatibility boundary conditions derived from the governing equations, as well as interior and boundary grid values, to construct a local polynomial, whose degree matches the order of accuracy of the interior scheme, centered at each boundary point. The local polynomial is then used to derive a discrete formula for each ghost point in terms of the data. This approach leads to centered approximations that are generally more accurate and stable than one-sided approximations. Moreover, the stencil approximations are local since they do not couple to neighboring ghost-point values, which can occur with traditional compatibility conditions. The local polynomial is derived using continuous operators and derivatives, which enables the automatic construction of stencil approximations at different orders of accuracy. The LCBC method is developed here for problems governed by second-order partial differential equations, and it is verified in two space dimensions for schemes up to sixth-order accuracy. [ABSTRACT FROM AUTHOR]