The solution of partial differential equations which describe physical phenomena by the use of coordinate transformations is described. The constraints of the problems are stated in geometric terms and include boundary constraints, uniformity constraints, and internal constraints. Algebraic mesh generations are very satisfactory for these constraints
Among the presently known numerical solvers of integral equations, two main categories of approaches...
The details of extended physical processes, such as the gas dynamic flow over an airfoil, the reacti...
The General Interpolants Method (GIM) code which solves the multidimensional Navier-Stokes equations...
Many physical phenomena can bc modelcd by partial diffcrcntial cąuations. The dcvclopmcnt of numcric...
An intense research effort over the last few years has produced several competing and apparently div...
AbstractThis paper is concerned with analysis and applications of geometry-grid generation methodolo...
An efficient numerical mesh generation scheme capable of creating orthogonal or nearly orthogonal gr...
The hyperbolic scheme is used to efficiently generate smoothly varying grids with good step size con...
An interactive program for algebraic generation of structured surface grids in three dimensional spa...
Numerical simulations of partial differential equations problems are used in a variety of domains. ...
The generation of metric coefficients of the coordinate transformation from a generally curved-sided...
AbstractThe control point form of algebraic grid generation is developed in a rigorous manner to ill...
A general program is developed to generate finite element mesh over curved surfaces. The domain to b...
Some of the techniques are summarized which are used in constructing C sup 0 and C sup 1 continuous ...
A fast and versatile procedure for algebraically generating boundary conforming computational grids ...
Among the presently known numerical solvers of integral equations, two main categories of approaches...
The details of extended physical processes, such as the gas dynamic flow over an airfoil, the reacti...
The General Interpolants Method (GIM) code which solves the multidimensional Navier-Stokes equations...
Many physical phenomena can bc modelcd by partial diffcrcntial cąuations. The dcvclopmcnt of numcric...
An intense research effort over the last few years has produced several competing and apparently div...
AbstractThis paper is concerned with analysis and applications of geometry-grid generation methodolo...
An efficient numerical mesh generation scheme capable of creating orthogonal or nearly orthogonal gr...
The hyperbolic scheme is used to efficiently generate smoothly varying grids with good step size con...
An interactive program for algebraic generation of structured surface grids in three dimensional spa...
Numerical simulations of partial differential equations problems are used in a variety of domains. ...
The generation of metric coefficients of the coordinate transformation from a generally curved-sided...
AbstractThe control point form of algebraic grid generation is developed in a rigorous manner to ill...
A general program is developed to generate finite element mesh over curved surfaces. The domain to b...
Some of the techniques are summarized which are used in constructing C sup 0 and C sup 1 continuous ...
A fast and versatile procedure for algebraically generating boundary conforming computational grids ...
Among the presently known numerical solvers of integral equations, two main categories of approaches...
The details of extended physical processes, such as the gas dynamic flow over an airfoil, the reacti...
The General Interpolants Method (GIM) code which solves the multidimensional Navier-Stokes equations...