In this paper we deal with high oscillatory systems and numerical methods for the approximation of their solutions. Some classical schemes developed in the literature are recalled and a recent approach based on the expression of the oscillatory solution by means of the exponential map is considered. Moreover we introduce a new method based on the Cayley map and provide some numerical tests in order to compare the different approaches
We describe an asymptotic method for approximating solutions of systems of ODEs with oscillatory fo...
The well-known steady state solution of nonlinear oscillatory circuits based on the use of Fourier s...
In this paper we consider numerical methods for solving nonlinear equations on matrix Lie groups. Re...
This thesis presents methods for efficient numerical approximation of linear and non-linear systems ...
The paper demonstrates symmetric integral operator and interpolation based numerical approximations ...
This paper surveys recent advances in the allied challenges of discretizing highly oscillatory ordin...
We present a method to compute efficiently solutions of systems of ordinary differential equations (...
We present a method to compute efficiently solutions of systems of ordinary differential equations (...
Two types of algorithms are presented to approximate highly oscillatory and non-oscillatory first or...
Abstract. We present a method to compute efficiently solutions of systems of ordinary differ-ential ...
In the preceding paper a new method of analyzing nonlinear periodic oscillations was proposed. In th...
Reaction-diffusion systems whose kinetics contain a stable limit cycle are an established class of m...
We describe an algorithm for the numerical solution of second order linear differential equ...
This paper deals with numerical methods for the discretization of highly oscillatory systems. We app...
n recent years several numerical methods have been developed to integrate matrix differential system...
We describe an asymptotic method for approximating solutions of systems of ODEs with oscillatory fo...
The well-known steady state solution of nonlinear oscillatory circuits based on the use of Fourier s...
In this paper we consider numerical methods for solving nonlinear equations on matrix Lie groups. Re...
This thesis presents methods for efficient numerical approximation of linear and non-linear systems ...
The paper demonstrates symmetric integral operator and interpolation based numerical approximations ...
This paper surveys recent advances in the allied challenges of discretizing highly oscillatory ordin...
We present a method to compute efficiently solutions of systems of ordinary differential equations (...
We present a method to compute efficiently solutions of systems of ordinary differential equations (...
Two types of algorithms are presented to approximate highly oscillatory and non-oscillatory first or...
Abstract. We present a method to compute efficiently solutions of systems of ordinary differ-ential ...
In the preceding paper a new method of analyzing nonlinear periodic oscillations was proposed. In th...
Reaction-diffusion systems whose kinetics contain a stable limit cycle are an established class of m...
We describe an algorithm for the numerical solution of second order linear differential equ...
This paper deals with numerical methods for the discretization of highly oscillatory systems. We app...
n recent years several numerical methods have been developed to integrate matrix differential system...
We describe an asymptotic method for approximating solutions of systems of ODEs with oscillatory fo...
The well-known steady state solution of nonlinear oscillatory circuits based on the use of Fourier s...
In this paper we consider numerical methods for solving nonlinear equations on matrix Lie groups. Re...