Membrane Calculus: a formal method for Grid transactions

A novel method to generate body-fitted grids based on the direct solution for three scalar functions is derived. The solution for scalar variables x, p and n is obtained with a conventional finite volume method based on a physical space formulation. The grid is adapted or re-zoned to eliminate the r

## Communicated by G. F. Roach A numerical technique for determining the solution of the brachistochrone problem is presented. The brachistochrone problem is first formulated as a non-linear optimal control problem. Using Chebyshev nodes, we construct the Mth degree polynomial interpolation to ap

A local grid refinement method is presented and applied to a three-dimensional turbulent recirculating flow. It is based on the staggered grid arrangement. The computational domain is covered by block-structured subgrids of different refinement levels. The exchange of information between the subgrid

In the numerical simulation of fluid flows using a polar cylindrical grid, grid lines meet at a single point on the axis of the polar cylindrical grid system; this makes the grids around the axis degenerate from being general quadrilaterals into triangles. Therefore, a special treatment must be perf