Taylor-series integration is a numerical integration technique that computes the Taylor series of state variables using recurrence relations and uses this series to propagate the state in time. A Taylor-series integration reentry integrator is developed and compared with the fifth-order Runge–Kutta–Fehlberg integrator to determine whether Taylor-series integration is faster than traditional integration methods for reentry applications. By comparing the central processing unit times of the integrators, Taylor-series integration is indeed found to be faster for integration without wind and slower with wind, unless the error tolerance is 10−8 or lower. Furthermore, it is found that reducing step sizes to prevent integration over discontinuitie...
See also the dissertation of Matt Berry http://scholar.lib.vt.edu/theses/available/etd-04282004-0712...
Report on numerical methods of integration includes the extrapolation methods of Bulirsch-Stoer and ...
A new class of linear multistep methods for numerical integration of differential equations is repor...
Taylor-series integration is a numerical integration technique that computes the Taylor series of st...
A variable-order, variable-step Taylor series integration algorithm was implemented in NASA Glenn's ...
The integration is discussed of the vector differential equation X = F(x, t) from time t sub i to t ...
Report discusses several methods of performing numerical integration with computer. When data can be...
It has been known for some time that Taylor series (TS) integration is among the most efficient and ...
Taylor series integration is implemented in NASA Glenn's Spacecraft N-body Analysis Program, and com...
This article deals with a high order integration method based on the Taylor series. The paper shows ...
The use of Taylor Series Integration (TSI) for the propagation of spacecraft trajectories and its co...
This paper constructs highly accurate and efficient time integration methods for the solution of tra...
This paper focuses on the Gauss-Jackson algorithm for numerical integration, which particularly suit...
Comparison of fourth order Runge-Kutta numerical integration technique with two numerical integratio...
In this paper the fixed step Gauss-Jackson method is compared to two variable step integrators. The...
See also the dissertation of Matt Berry http://scholar.lib.vt.edu/theses/available/etd-04282004-0712...
Report on numerical methods of integration includes the extrapolation methods of Bulirsch-Stoer and ...
A new class of linear multistep methods for numerical integration of differential equations is repor...
Taylor-series integration is a numerical integration technique that computes the Taylor series of st...
A variable-order, variable-step Taylor series integration algorithm was implemented in NASA Glenn's ...
The integration is discussed of the vector differential equation X = F(x, t) from time t sub i to t ...
Report discusses several methods of performing numerical integration with computer. When data can be...
It has been known for some time that Taylor series (TS) integration is among the most efficient and ...
Taylor series integration is implemented in NASA Glenn's Spacecraft N-body Analysis Program, and com...
This article deals with a high order integration method based on the Taylor series. The paper shows ...
The use of Taylor Series Integration (TSI) for the propagation of spacecraft trajectories and its co...
This paper constructs highly accurate and efficient time integration methods for the solution of tra...
This paper focuses on the Gauss-Jackson algorithm for numerical integration, which particularly suit...
Comparison of fourth order Runge-Kutta numerical integration technique with two numerical integratio...
In this paper the fixed step Gauss-Jackson method is compared to two variable step integrators. The...
See also the dissertation of Matt Berry http://scholar.lib.vt.edu/theses/available/etd-04282004-0712...
Report on numerical methods of integration includes the extrapolation methods of Bulirsch-Stoer and ...
A new class of linear multistep methods for numerical integration of differential equations is repor...