Add to ORKGIt is well-known that the solution of Hamilton-Jacobi equation may have singularity i.e., the solution is non-smooth or nearly non-smooth. We construct a frozen Jacobian multi-step iterative method for solving Hamilton-Jacobi equation under the assumption that the solution is nearly singular. The frozen Jacobian iterative methods are computationally very efficient because a single instance of the iterative method uses a single inversion (in the scene of LU factorization) of the frozen Jacobian. The multi-step part enhances the convergence order by solving lower and upper triangular systems. The convergence order of our proposed iterative method is 3(m-1) for m>=3. For attaining good numerical accuracy in the solution, we use Chebyshev pseud...
The main focus of research in the current article is to address the construction of an efficient hig...
In this article, we first introduce aLax-Friedrichs type finite difference method to compute the $\m...
Fast sweeping methods utilize the Gauss-Seidel iterations and alternating sweeping strat-egy to achi...
It is well-known that the solution of Hamilton-Jacobi equation may have singularity i.e., the soluti...
Frozen Jacobian iterative methods are of practical interest to solve the system of nonlinear equatio...
A multi-step frozen Jacobian iterative scheme for solving system of nonlinear equations associa...
A multi-step frozen Jacobian iterative scheme for solving system of nonlinear equations associated w...
In this paper, we present and illustrate a frozen Jacobian multistep iterative method to solve syste...
In this paper, we present and illustrate a frozen Jacobian multistep iterative method to solve syste...
A homotopy method is presented for the construction of frozen Jacobian iterative methods. The frozen...
A homotopy method is presented for the construction of frozen Jacobian iterative methods. The frozen...
A homotopy method is presented for the construction of frozen Jacobian iterative methods. The frozen...
We propose a simple, fast sweeping method based on the Lax-Friedrichs monotone numerical Hamiltonian...
In the present study, we consider multi-step iterative method to solve systems of nonlinear equation...
We introduce two types of finite difference methods to compute the Lsolution [14] and the proper vi...
The main focus of research in the current article is to address the construction of an efficient hig...
In this article, we first introduce aLax-Friedrichs type finite difference method to compute the $\m...
Fast sweeping methods utilize the Gauss-Seidel iterations and alternating sweeping strat-egy to achi...
It is well-known that the solution of Hamilton-Jacobi equation may have singularity i.e., the soluti...
Frozen Jacobian iterative methods are of practical interest to solve the system of nonlinear equatio...
A multi-step frozen Jacobian iterative scheme for solving system of nonlinear equations associa...
A multi-step frozen Jacobian iterative scheme for solving system of nonlinear equations associated w...
In this paper, we present and illustrate a frozen Jacobian multistep iterative method to solve syste...
In this paper, we present and illustrate a frozen Jacobian multistep iterative method to solve syste...
A homotopy method is presented for the construction of frozen Jacobian iterative methods. The frozen...
A homotopy method is presented for the construction of frozen Jacobian iterative methods. The frozen...
A homotopy method is presented for the construction of frozen Jacobian iterative methods. The frozen...
We propose a simple, fast sweeping method based on the Lax-Friedrichs monotone numerical Hamiltonian...
In the present study, we consider multi-step iterative method to solve systems of nonlinear equation...
We introduce two types of finite difference methods to compute the Lsolution [14] and the proper vi...
The main focus of research in the current article is to address the construction of an efficient hig...
In this article, we first introduce aLax-Friedrichs type finite difference method to compute the $\m...
Fast sweeping methods utilize the Gauss-Seidel iterations and alternating sweeping strat-egy to achi...