In this paper, we develop a finite element method for the temporal discretization of the equations of motion. The continuous Galerkin method is based upon a weighted-residual statement of Hamilton's canonical equations. We show that the proposed finite element formulation is energy conserving in a natural sense. A family of implicit one-step algorithms is generated by specifying the polynomial approximation in conjunction with the quadrature formula used for the evaluation of time integrals. The numerical implementation of linear, quadratic, and cubic time finite elements is treated in detail for the model problem of a circular pendulum. In addition to that, concerning dynamical systems with several degrees of freedom, we address the design...
When numerically integrating canonical Hamiltonian systems, the long-term conservation of some of it...
A general computational procedure and developments for the numerical discretization of continuum-ela...
The transient heat conduction problem can be solved by application of Galerkin's method to space as ...
In the present paper a systematic development of higher order accurate time stepping schemes which e...
In the present paper one‐step implicit integration algorithms for non‐linear elastodynamics are deve...
In the present paper one‐step implicit integration algorithms for the N‐body problem are developed. ...
In this note we suggest a new approach to ensure energy conservation in time-continuous finite eleme...
Time finite element methods are developed for the equations of structural dynamics. The approach emp...
In this thesis, the enhanced Galerkin (eG) finite element method in time is presented. The eG method...
Schemes that can be proven to be unconditionally stable in the linear context can yield unstable sol...
A Galerkin‐based discretization method for index 3 differential algebraic equations pertaining to fi...
none3In this paper a new time discontinuous Galerkin formulation for non-linear elastodynamics is pr...
The consideration of plastic deformations in a dynamical framework is a demanding task in computatio...
AbstractVarious systems in nature have a Hamiltonian structure and therefore accurate time integrato...
Various systems in nature have a Hamiltonian structure and therefore accurate time integrators for t...
When numerically integrating canonical Hamiltonian systems, the long-term conservation of some of it...
A general computational procedure and developments for the numerical discretization of continuum-ela...
The transient heat conduction problem can be solved by application of Galerkin's method to space as ...
In the present paper a systematic development of higher order accurate time stepping schemes which e...
In the present paper one‐step implicit integration algorithms for non‐linear elastodynamics are deve...
In the present paper one‐step implicit integration algorithms for the N‐body problem are developed. ...
In this note we suggest a new approach to ensure energy conservation in time-continuous finite eleme...
Time finite element methods are developed for the equations of structural dynamics. The approach emp...
In this thesis, the enhanced Galerkin (eG) finite element method in time is presented. The eG method...
Schemes that can be proven to be unconditionally stable in the linear context can yield unstable sol...
A Galerkin‐based discretization method for index 3 differential algebraic equations pertaining to fi...
none3In this paper a new time discontinuous Galerkin formulation for non-linear elastodynamics is pr...
The consideration of plastic deformations in a dynamical framework is a demanding task in computatio...
AbstractVarious systems in nature have a Hamiltonian structure and therefore accurate time integrato...
Various systems in nature have a Hamiltonian structure and therefore accurate time integrators for t...
When numerically integrating canonical Hamiltonian systems, the long-term conservation of some of it...
A general computational procedure and developments for the numerical discretization of continuum-ela...
The transient heat conduction problem can be solved by application of Galerkin's method to space as ...