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基于谱估计的微振动测试与评估方法及其应用
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作者 王红娟 唐琳 邹进贵 《核技术》 EI CAS CSCD 北大核心 2024年第11期16-22,共7页
随着第四代同步辐射光源对束流亮度和发射度的要求日益严苛,微振动对束流品质的影响逐渐凸显。然而,国际上尚无统一的标准来全面测试和评估地基微振动的影响,对微振动的有效管理和控制变得尤为困难。本文建立基于谱估计的振动数据处理模... 随着第四代同步辐射光源对束流亮度和发射度的要求日益严苛,微振动对束流品质的影响逐渐凸显。然而,国际上尚无统一的标准来全面测试和评估地基微振动的影响,对微振动的有效管理和控制变得尤为困难。本文建立基于谱估计的振动数据处理模型,并提出基于概率统计的方法来评估地基微振动位移,全面客观地评价振动位移有效值。利用该模型对武汉先进光源预研基地的实验大厅进行振动对比测试、振源分析及振动位移评估,得出垂直方向的振动位移有效值的平均值(Average Root Mean Square,Ave RMS)为8.08 nm,标准偏差σ为4.55 nm,即垂直振动位移(Ave RMS+3σ)为21.73 nm,满足40 nm的设计要求。该振动数据处理方法不仅适用于初始地块与基础隔振处理后地基的振动评估,还适用于元部件级别的振源排查分析。 展开更多
关键词 地基微振动 随机振动 位移功率谱密度 振动位移有效值 同步辐射光源
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Solving Nonlinear Differential Equation Governing on the Rigid Beams on Viscoelastic Foundation by AGM 被引量:1
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作者 M. R. Akbari D. D. Ganji +1 位作者 A. K. Rostami M. Nimafar 《Journal of Marine Science and Application》 CSCD 2015年第1期30-38,共9页
In the present paper a vibrational differential equation governing on a rigid beam on viscoelastic foundation has been investigated. The nonlinear differential equation governing on this vibrating system is solved by ... In the present paper a vibrational differential equation governing on a rigid beam on viscoelastic foundation has been investigated. The nonlinear differential equation governing on this vibrating system is solved by a simple and innovative approach, which has been called Akbari-Ganji's method (AGM). AGM is a very suitable computational process and is usable for solving various nonlinear differential equations. Moreover, using AGM which solving a set of algebraic equations, complicated nonlinear equations can easily be solved without any mathematical operations. Also, the damping ratio and energy lost per cycle for three cycles have been investigated. Furthermore, comparisons have been made between the obtained results by numerical method (Runk45) and AGM. Results showed the high accuracy of AGM. The results also showed that by increasing the amount of initial amplitude of vibration (A), the value of damping ratio will be increased, and the energy lost per cycle decreases by increasing the number of cycle. It is concluded that AGM is a reliable and precise approach for solving differential equations. On the other hand, it is better to say that AGM is able to solve linear and nonlinear differential equations directly in most of the situations. This means that the final solution can be obtained without any dimensionless procedure Therefore, AGM can be considered as a significant progress in nonlinear sciences. 展开更多
关键词 nonlinear differential equation Akbari-Ganji's method(AGM) rigid beam viscoelastic foundation vibrating system damping ratio energy lost per cycle
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