APPLYING DISCRETE CONTROL THEORY TO DEVELOP AN EXPLICIT INTEGRATION ALGORITHM WITH UNCONDITIONAL STABLILITY AND CONTROLLABLE NUMERICAL DAMPING FOR REAL-TIME TESTING
Integration algorithms are typically utilized in structural dynamics to obtain solution to the temporally discretized equations of motion.Stability is an important issue to be considered when selecting the proper integration algorithm for analysis of structures with a large number of degrees of freedom.Recent development of real-time structural testing brings more challenges to researchers selecting appropriate integration algorithms.An explicit algorithm is more favorable because of its computational efficiency but often constrained by its conditional stability.Moreover,numerical errors often lead to the spurious growth of high-frequency response in the dynamic analysis and the presence of inevitable experimental errors will aggravate this effect in real-time structural testing.It is therefore desirable for an explicit algorithm to not only have unconditional stability but also possess numerical damping to suppress any spurious participation of the high-frequency response while the lower modes can be integrated accurately.This paper presents the development of an unconditionally stable explicit integration algorithm with controllable numerical damping using discrete control theory.
Intergration algorithm real-time testing numerical damping stability explicit
Cheng Chen
School of Engineering, San Francisco State University, San Francisco, CA, U.S.A.
国际会议
The Twelfth International Symposium on Structural Engineering (第十二届结构工程国际研讨会)
武汉
英文
329-335
2012-11-17(万方平台首次上网日期,不代表论文的发表时间)