Add to ORKGIn this paper we proposed a two-level finite element discretization of the nonlinear stationary quasi-geostrophic equations, which model the wind driven large scale ocean circulation. Optimal error estimates for the two-level finite element discretization were derived. Numerical experiments for the two-level algorithm with the Argyris finite element were also carried out. The numerical results verified the theoretical error estimates and showed that, for the appropriate scaling between the coarse and fine mesh sizes, the two-level algorithm significantly decreases the computational time of the standard one-level algorithm
A stabilized finite-element (FE) algorithm for the solution of oceanic large scale circulation equat...
AbstractWe analyze a two-level method of discretizing the stream function form of the Navier-Stokes ...
Numerical modeling is now, along with experiment and theory, part of the scientific method. Numerica...
In this paper we proposed a two-level finite element discretization of the nonlinear stationary quas...
Abstract. This paper presents a conforming finite element semi-discretization of the streamfunction ...
We present the results of an error analysis of a B-spline based finite-element approximation of the ...
We present the results of an error analysis of a B-spline based finite-element approximation of the ...
Preliminary results of a two-layer quasi-geostrophic box model of a wind-driven ocean are presented....
We present the error analysis of a B-spline based finite-element approximation of the stream-functio...
We present the error analysis of a B-spline based finite-element approximation of the stream-functio...
A finite-element-based numerical algorithm is developed to solve the two-dimensional incompressible ...
This paper puts forth a coarse grid projection (CGP) multiscale method to accelerate computations of...
The purpose of this thesis is to develop a new barotropic ocean model to study ocean dynamics. The m...
We study a stationary Quasi-Geostrophic type equation in one or two dimensional spaces, with a quick...
Comprehension of global oceanic currents and, ultimately, of climate variability requires the use of...
A stabilized finite-element (FE) algorithm for the solution of oceanic large scale circulation equat...
AbstractWe analyze a two-level method of discretizing the stream function form of the Navier-Stokes ...
Numerical modeling is now, along with experiment and theory, part of the scientific method. Numerica...
In this paper we proposed a two-level finite element discretization of the nonlinear stationary quas...
Abstract. This paper presents a conforming finite element semi-discretization of the streamfunction ...
We present the results of an error analysis of a B-spline based finite-element approximation of the ...
We present the results of an error analysis of a B-spline based finite-element approximation of the ...
Preliminary results of a two-layer quasi-geostrophic box model of a wind-driven ocean are presented....
We present the error analysis of a B-spline based finite-element approximation of the stream-functio...
We present the error analysis of a B-spline based finite-element approximation of the stream-functio...
A finite-element-based numerical algorithm is developed to solve the two-dimensional incompressible ...
This paper puts forth a coarse grid projection (CGP) multiscale method to accelerate computations of...
The purpose of this thesis is to develop a new barotropic ocean model to study ocean dynamics. The m...
We study a stationary Quasi-Geostrophic type equation in one or two dimensional spaces, with a quick...
Comprehension of global oceanic currents and, ultimately, of climate variability requires the use of...
A stabilized finite-element (FE) algorithm for the solution of oceanic large scale circulation equat...
AbstractWe analyze a two-level method of discretizing the stream function form of the Navier-Stokes ...
Numerical modeling is now, along with experiment and theory, part of the scientific method. Numerica...