Computational efficiency of solving the dynamics of highly oscillatory systems is an important issue due to the requirement of small step size of explicit numerical integration algorithms. A system is considered to be highly oscillatory if it contains a fast solution that varies regularly about a slow solution. As for multibody systems, stiff force elements and contacts between bodies can make a system highly oscillatory. Standard explicit numerical integration methods should take a very small step size to satisfy the absolute stability condition for all eigenvalues of the system and the computational cost is dictated by the fast solution. In this research, a new hybrid integration scheme is proposed, in which the local linearization method...
The numerical integration of highly oscillatory Hamiltonian systems, such as those arising in molecu...
Numerical methods that preserve properties of Hamiltonian systems, reversible systems, differential ...
Simulation of large physical systems often leads to initial value problems in which some of the solu...
Computational efficiency of solving the dynamics of highly oscillatory systems is an important issue...
Some multi degree-of-freedom dynamical systems exhibit a response that contain fast and slow variabl...
It is a known fact that in most cases, to integrate an oscillatory problem, higher order A-stable me...
We derived in this thesis new highly dispersive and highly dissipative two-step explicit hybrid meth...
We consider the efficient numerical solution of coupled dynamical systems, consisting of a low dimen...
International audienceNumerical methods are necessary to understand the behav- iors of complex hybri...
Current research made contribution to the numerical analysis of highly oscillatory ordinary differen...
Abstract. Numerical methods are necessary to understand the behav-iors of complex hybrid systems use...
One of the outstanding problems in the numerical simulation of mechanical systems is the development...
This paper constructs highly accurate and efficient time integration methods for the solution of tra...
In this paper we present a high order method for the evaluation of integrals of highly oscillatory ...
We introduce a new methodology to design uniformly accurate methods for oscillatory evolution equati...
The numerical integration of highly oscillatory Hamiltonian systems, such as those arising in molecu...
Numerical methods that preserve properties of Hamiltonian systems, reversible systems, differential ...
Simulation of large physical systems often leads to initial value problems in which some of the solu...
Computational efficiency of solving the dynamics of highly oscillatory systems is an important issue...
Some multi degree-of-freedom dynamical systems exhibit a response that contain fast and slow variabl...
It is a known fact that in most cases, to integrate an oscillatory problem, higher order A-stable me...
We derived in this thesis new highly dispersive and highly dissipative two-step explicit hybrid meth...
We consider the efficient numerical solution of coupled dynamical systems, consisting of a low dimen...
International audienceNumerical methods are necessary to understand the behav- iors of complex hybri...
Current research made contribution to the numerical analysis of highly oscillatory ordinary differen...
Abstract. Numerical methods are necessary to understand the behav-iors of complex hybrid systems use...
One of the outstanding problems in the numerical simulation of mechanical systems is the development...
This paper constructs highly accurate and efficient time integration methods for the solution of tra...
In this paper we present a high order method for the evaluation of integrals of highly oscillatory ...
We introduce a new methodology to design uniformly accurate methods for oscillatory evolution equati...
The numerical integration of highly oscillatory Hamiltonian systems, such as those arising in molecu...
Numerical methods that preserve properties of Hamiltonian systems, reversible systems, differential ...
Simulation of large physical systems often leads to initial value problems in which some of the solu...