In this paper we use the theory of Faber polynomials for solving N-dimensional linear initial value problems. In particular, we use Faber polynomials to approximate the evolution operator creating the so-called exponential integrators. We also provide a consistence and convergence analysis. Some tests where we compare our methods with some Krylov exponential integrators are finally shown
Philosophy of exponential integrators Solve stiff initial-value problem u ′(t) = f (u(t)), u(0) = ...
In this paper we compare Krylov subspace methods with Faber series expansion for approximating the m...
This article studies time integration methods for stiff systems of ordinary differential equations ...
In this paper we use the theory of Faber polynomials for solving N-dimensional linear initial value ...
AbstractIn this paper we introduce a method for the approximation of the matrix exponential obtained...
In this paper we introduce a method for the approximation of the matrix exponential obtained by inte...
Exponential time integrators have been applied successfully in several physics-related differential ...
AbstractAlthough well known in function theory. Faber polynomials and the Faber transform have only ...
We propose a restarted Arnoldi's method with Faber polynomials and discuss its use for computing the...
The authors provide a numerical method in order to approximate the solution of a linear initial¿valu...
A fundamental theorem in the area of iterative methods is the Faber-Manteuffel Theorem [2]. It shows...
In this work, new techniques to improve the performance of exponential integrators are proposed. The...
We are investigating the size of minimal polynomials and Faber polynomials on annular sectors. The s...
We introduce a general format of numerical ODE-solvers which include many of the recently proposed e...
Abstract. The action of the matrix exponential and related ϕ functions on vectors plays an important...
Philosophy of exponential integrators Solve stiff initial-value problem u ′(t) = f (u(t)), u(0) = ...
In this paper we compare Krylov subspace methods with Faber series expansion for approximating the m...
This article studies time integration methods for stiff systems of ordinary differential equations ...
In this paper we use the theory of Faber polynomials for solving N-dimensional linear initial value ...
AbstractIn this paper we introduce a method for the approximation of the matrix exponential obtained...
In this paper we introduce a method for the approximation of the matrix exponential obtained by inte...
Exponential time integrators have been applied successfully in several physics-related differential ...
AbstractAlthough well known in function theory. Faber polynomials and the Faber transform have only ...
We propose a restarted Arnoldi's method with Faber polynomials and discuss its use for computing the...
The authors provide a numerical method in order to approximate the solution of a linear initial¿valu...
A fundamental theorem in the area of iterative methods is the Faber-Manteuffel Theorem [2]. It shows...
In this work, new techniques to improve the performance of exponential integrators are proposed. The...
We are investigating the size of minimal polynomials and Faber polynomials on annular sectors. The s...
We introduce a general format of numerical ODE-solvers which include many of the recently proposed e...
Abstract. The action of the matrix exponential and related ϕ functions on vectors plays an important...
Philosophy of exponential integrators Solve stiff initial-value problem u ′(t) = f (u(t)), u(0) = ...
In this paper we compare Krylov subspace methods with Faber series expansion for approximating the m...
This article studies time integration methods for stiff systems of ordinary differential equations ...