Most commonly used second-order-accurate, dissipative time integration algorithms for structural dynamics possess a spurious root. For an algorithm to be accurate, it has been suggested that the spurious root must be small and ideally be zero in the low-frequency limit. In the paper we show that good accuracy can be achieved even if the spurious root does not tend towards zero in the low-frequency limit. This permits more flexibility in the design of time integration algorithms. As an example, we present an algorithm that has greater accuracy than several other dissipative algorithms even though for all frequencies its spurious root is non-zero. We also show that the degraded performance of the Bazzi-Ρ algorithm is not due to its non-zero s...
International audienceThis paper deals with the accuracy of a numerical time integration scheme, the...
A new time integration scheme is presented for solving the differential equation of motion with nonl...
Computational efficiency and accuracy are two of the most important properties of integration method...
Most commonly used second-order-accurate, dissipative time integration algorithms for structural dyn...
This paper deals with the accuracy of time integration methods for linear dynamics when applied near...
When solving the equations of structural dynamics using direct time integration methods, algorithmic...
This study deals with several time integration algorithms in structural dynamics. We focus on their ...
A new family of higher-order implicit, one-step integration algorithms has been developed and evalua...
A new family of implicit, single-step time integration methods is presented for solving structural d...
This paper describes a modal weighting technique that improves the stability characteristics of expl...
In this paper a new method is proposed for the direct time integration method for structural dynamic...
In this dissertation one family of second-order and two families of higher-order time integration al...
New dissipative time integration algorithms are presented for solving systems of second-order ordina...
Three structure-dependent integration methods have been developed for solving equations of motion, w...
We deal with the well known and largely adopted Gear integration method that belongs to the class of...
International audienceThis paper deals with the accuracy of a numerical time integration scheme, the...
A new time integration scheme is presented for solving the differential equation of motion with nonl...
Computational efficiency and accuracy are two of the most important properties of integration method...
Most commonly used second-order-accurate, dissipative time integration algorithms for structural dyn...
This paper deals with the accuracy of time integration methods for linear dynamics when applied near...
When solving the equations of structural dynamics using direct time integration methods, algorithmic...
This study deals with several time integration algorithms in structural dynamics. We focus on their ...
A new family of higher-order implicit, one-step integration algorithms has been developed and evalua...
A new family of implicit, single-step time integration methods is presented for solving structural d...
This paper describes a modal weighting technique that improves the stability characteristics of expl...
In this paper a new method is proposed for the direct time integration method for structural dynamic...
In this dissertation one family of second-order and two families of higher-order time integration al...
New dissipative time integration algorithms are presented for solving systems of second-order ordina...
Three structure-dependent integration methods have been developed for solving equations of motion, w...
We deal with the well known and largely adopted Gear integration method that belongs to the class of...
International audienceThis paper deals with the accuracy of a numerical time integration scheme, the...
A new time integration scheme is presented for solving the differential equation of motion with nonl...
Computational efficiency and accuracy are two of the most important properties of integration method...