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 have an oscillatory solution if it contains a fast solution that varies regularly about a slow solution. This paper investigates the use of the so-called Local Linearization Method (LLM) in the integration of multibody equations of motion that exhibit oscillatory behavior. The LLM is an exponential method that is based on the piecewise linear approximation of the equations through a firstorder Taylor expansion at each time step, where the solution at the next time step is determined by the analytic solution of the approximated li...
"Series title: Springerbriefs in applied sciences and technology, ISSN 2191-530X"This chapter presen...
One of the outstanding problems in the numerical simulation of mechanical systems is the development...
Abstract. Considered are numerical integration schemes for nondissipative dynamical systems in which...
Computational efficiency of solving the dynamics of highly oscillatory systems is an important issue...
Local Linearization (LL) methods conform a class of one-step explicit integrators for ODEs derived f...
The Local Linearization (LL) method for the integration of ordinary differential equations is an exp...
Multibody dynamics formulations usually express the dynamics of a mechanical system as a set of high...
High angular rates encountered in real-time flight simulation problems may require a more stable and...
Abstract. This paper introduces a general technique for the construction of multistep methods capabl...
In the first part of this study an exponential integration scheme for computing solutions of large s...
Summary. In this paper, a new method to eciently compute accelerations and Lagrange multipliers in t...
A common feature of most methods for numerically solving ordinary differential equations is that the...
In the first part of this study an exponential integration scheme for computing solutions of large s...
An implicit family of multi-step transversal linearization (MTL) methods is proposed for efficient a...
A family of multi-step tangential linearization (MTnL) techniques is developed for numeric-analytic ...
"Series title: Springerbriefs in applied sciences and technology, ISSN 2191-530X"This chapter presen...
One of the outstanding problems in the numerical simulation of mechanical systems is the development...
Abstract. Considered are numerical integration schemes for nondissipative dynamical systems in which...
Computational efficiency of solving the dynamics of highly oscillatory systems is an important issue...
Local Linearization (LL) methods conform a class of one-step explicit integrators for ODEs derived f...
The Local Linearization (LL) method for the integration of ordinary differential equations is an exp...
Multibody dynamics formulations usually express the dynamics of a mechanical system as a set of high...
High angular rates encountered in real-time flight simulation problems may require a more stable and...
Abstract. This paper introduces a general technique for the construction of multistep methods capabl...
In the first part of this study an exponential integration scheme for computing solutions of large s...
Summary. In this paper, a new method to eciently compute accelerations and Lagrange multipliers in t...
A common feature of most methods for numerically solving ordinary differential equations is that the...
In the first part of this study an exponential integration scheme for computing solutions of large s...
An implicit family of multi-step transversal linearization (MTL) methods is proposed for efficient a...
A family of multi-step tangential linearization (MTnL) techniques is developed for numeric-analytic ...
"Series title: Springerbriefs in applied sciences and technology, ISSN 2191-530X"This chapter presen...
One of the outstanding problems in the numerical simulation of mechanical systems is the development...
Abstract. Considered are numerical integration schemes for nondissipative dynamical systems in which...