An interpolation based finite difference method on non-uniform grid for solving Navier stokes equations
This paper presents a Hermite polynomial interpolation based method to construct high-order accuracy finite difference schemes on non-uniform grid. This method can achieve arbitrary order accuracy by expanding the grid stencil and involving higher order derivatives. The paper first constructs combin...
Main Authors: | Chen, Weijia, Chen, Jim C., Lo, Edmond Yat-Man |
---|---|
Other Authors: | School of Civil and Environmental Engineering |
Format: | Journal Article |
Language: | English |
Published: |
2014
|
Subjects: | |
Online Access: | https://hdl.handle.net/10356/100202 http://hdl.handle.net/10220/24055 |
Similar Items
-
Combined compact difference method for solving the incompressible Navier-Stokes equations
by: Chen, Jim C., et al.
Published: (2013) -
Finite difference method and finite volume method for solving navier-stokes equation in sea water movement
by: Mohamed, Nur Syahida
Published: (2013) -
Hybrid interpolative mappings for solving fractional Navier–Stokes and functional differential equations
by: Hasanen A. Hammad, et al.
Published: (2023-12-01) -
Orthogonal curvilinear grid and spectral expansions for the solution of navier-stokes equation
by: Osman , Kahar
Published: (2013) -
Finite element methods and navier-stokes equations /
by: Cuvelier, C. (Cornelis), 1948-, et al.
Published: (1986)