Abstract. A fourth-order finite difference method is proposed and studied for the primitive equations (PEs) of large-scale atmospheric and oceanic flow based on mean vorticity formulation. Since the vertical average of the horizontal velocity field is divergence-free, we can introduce mean vorticity and mean stream function which are connected by a 2-D Poisson equation. As a result, the PEs can be reformulated such that the prognostic equation for the horizontal velocity is replaced by evolutionary equa-tions for the mean vorticity field and the vertical derivative of the horizontal velocity. The mean vorticity equation is approximated by a compact difference scheme due to the difficulty of the mean vorticity boundary condition, while fourt...
The convergence of a fourth order finite difference method for the 2-D unsteady, viscous incompressi...
Using the fundamental principles of physics, a set of governing equations result that describes the ...
To understand the physics and dynamics of the ocean circulation, techniques of numerical bifurcation...
A semi-implicit, control-volume, nonhydrostatic model is presented. Advection is fifth order with re...
A note of caution is Provided to users of the widely-distributed Cox ocean circulation model. It is ...
A fourth order finite difference method is presented for the 2D unsteady viscous incompressible Bous...
The paper presents two types of finite-difference schemes to represent the barotropic vorticity equa...
Abstract. Numerical methods for the primitive equations (PEs) of oceanic flow are presented in this ...
The barotropic motion of a viscous fluid in a laboratory simulation of ocean circulation may be mode...
How to reduce the computational error is a key issue in numerical modeling and simulation. The highe...
The representation of nonlinear shallow-water flows poses severe challenges for numerical modeling. ...
An analysis of the vertical velocity field using the full generalized omega equation (omega-equation...
By means of the solution of the linearized equation for the vertical components of the vorticity, th...
A numerical model of a 6-level, baroclinic ocean with a fiat bottom and a regular coast line extendi...
Based on the box method, finite-difference versions of a system of primitive equations in spherical ...
The convergence of a fourth order finite difference method for the 2-D unsteady, viscous incompressi...
Using the fundamental principles of physics, a set of governing equations result that describes the ...
To understand the physics and dynamics of the ocean circulation, techniques of numerical bifurcation...
A semi-implicit, control-volume, nonhydrostatic model is presented. Advection is fifth order with re...
A note of caution is Provided to users of the widely-distributed Cox ocean circulation model. It is ...
A fourth order finite difference method is presented for the 2D unsteady viscous incompressible Bous...
The paper presents two types of finite-difference schemes to represent the barotropic vorticity equa...
Abstract. Numerical methods for the primitive equations (PEs) of oceanic flow are presented in this ...
The barotropic motion of a viscous fluid in a laboratory simulation of ocean circulation may be mode...
How to reduce the computational error is a key issue in numerical modeling and simulation. The highe...
The representation of nonlinear shallow-water flows poses severe challenges for numerical modeling. ...
An analysis of the vertical velocity field using the full generalized omega equation (omega-equation...
By means of the solution of the linearized equation for the vertical components of the vorticity, th...
A numerical model of a 6-level, baroclinic ocean with a fiat bottom and a regular coast line extendi...
Based on the box method, finite-difference versions of a system of primitive equations in spherical ...
The convergence of a fourth order finite difference method for the 2-D unsteady, viscous incompressi...
Using the fundamental principles of physics, a set of governing equations result that describes the ...
To understand the physics and dynamics of the ocean circulation, techniques of numerical bifurcation...