|
|
力学学报 2000
PRECISE TIME-INTEGRATION WITH[1mm] DIMENSION EXPANDING METHOD
|
Abstract:
The precise time-integration method proposed for linear time-invariant dynamic system can give precise numerical results approaching to the exact solution at the integration points.However, it is more or less difficult when the algorithm is used to the non-homogeneous dynamic systems due to the inverse matrix calculations. Precise time integration with dimensional expanding is proposed in the paper. By using the dimensional expanding, the non-homogeneous vector is viewed as the variables of the equations and the original equations are converted into homogeneous equations. Thus the new method avoids the inverse matrix calculations and improves the computing efficiency. In particular, the method is independent to the quality of the matrix H. If the matrix H is singular or nearly singular, the advantages of the method is remarkable. If the non-homogeneous vector is the solution of one ODEs, the method can give exact results. Otherwise, the methods of constant, linear or sinusoid approximation for the non-homogeneous vector can also give satisfying results. This new algorithm is not only benefit to both the programming implementation and the numerical stability, but also more efficient to large-scale problems. It has improved the precise time-integration method. Numerical examples are given to demonstrate the validity and efficiency of the algorithm.
