A new approach to order reduction using stability equation and big bang big crunch optimization

S. R. Desai, R. Prasad
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引用次数: 80

Abstract

A new method of model order reduction is introduced by combining the merits of big bang big crunch (BBBC) optimization technique and stability equation (SE) method. A linear-continuous single-input single-output system of higher order is considered and reduced to a lower order system. The denominator polynomial of the reduced system is obtained by SE method, whereas the numerator terms are generated using BBBC optimization. Furthermore, step and frequency responses of the original reduced system are plotted. The superiority of the proposed method is justified by solving numerical examples from the available literature and comparing the reduced systems in terms of error indices.
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一种利用稳定性方程和大爆炸大压缩优化的降阶新方法
结合大爆炸大压缩(BBBC)优化技术和稳定性方程(SE)方法的优点,提出了一种新的模型降阶方法。考虑高阶线性连续单输入单输出系统,并将其简化为低阶系统。简化后的系统的分母多项式采用SE法得到,分子项采用BBBC优化生成。此外,还绘制了原简化系统的阶跃响应和频率响应。通过对已有文献中的数值算例进行求解,并对简化后的系统进行误差指标的比较,证明了该方法的优越性。
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