A second-order scheme for integration of one-dimensional dynamic analysis

This paper proposes a second-order scheme of precision integration for dynamic analysis with respect to long-term integration. Rather than transforming into first-order equations, a recursive scheme is presented in detail for direct solution of the homogeneous part of second-order algebraic and differential equations. The sine and cosine matrices involved in the scheme are calculated using the so-called 2^N algorithm. Numerical tests show that both the efficiency and the accuracy of homogeneous equations can be improved considerably with the second-order scheme. The corresponding particular solution is also presented, incorporated with the second-order scheme where the excitation vector is approximated by the truncated Taylor series.

[1]  C. Bert,et al.  Differential Quadrature Method in Computational Mechanics: A Review , 1996 .

[2]  Chuei-Tin Chang,et al.  New insights in solving distributed system equations by the quadrature method—I. Analysis , 1989 .

[3]  Brian T. Smith,et al.  Matrix Eigensystem Routines — EISPACK Guide , 1974, Lecture Notes in Computer Science.

[4]  Xinqun Zhu,et al.  PRECISE TIME-STEP INTEGRATION FOR THE DYNAMIC RESPONSE OF A CONTINUOUS BEAM UNDER MOVING LOADS , 2001 .

[5]  Wanxie Zhong,et al.  High precision integration for dynamic structural systems with holonomic constraints , 1997 .

[6]  Chuei-Tin Chang,et al.  New insights in solving distributed system equations by the quadrature method—II. Numerical experiments , 1989 .

[7]  B. S. Garbow,et al.  Matrix Eigensystem Routines — EISPACK Guide , 1974, Lecture Notes in Computer Science.

[8]  W. Zhong,et al.  A Precise Time Step Integration Method , 1994 .

[9]  Frederic Ward Williams,et al.  A high precision direct integration scheme for non-stationary random seismic responses of non-classically damped structures , 1995 .

[10]  Frederic Ward Williams,et al.  Accurate high-speed computation of non-stationary random structural response , 1997 .

[11]  Zhi Zong,et al.  A localized differential quadrature (LDQ) method and its application to the 2D wave equation , 2002 .

[12]  Assem S. Deif,et al.  Advanced matrix theory for scientists and engineers , 1990 .

[13]  Paul Bugl Differential Equations: Matrices and Models , 1994 .

[14]  Frederic Ward Williams,et al.  A high precision direct integration scheme for structures subjected to transient dynamic loading , 1995 .

[15]  R. Bellman,et al.  DIFFERENTIAL QUADRATURE: A TECHNIQUE FOR THE RAPID SOLUTION OF NONLINEAR PARTIAL DIFFERENTIAL EQUATIONS , 1972 .