2020
DOI: 10.1002/stc.2572
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Multidimensional vibration reduction control of the frame structure with magnetorheological damper

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Cited by 12 publications
(10 citation statements)
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“…During the action time of the Kobe wave, the three-directional maximum accelerations of Node 154 of the structure without MRDs are 3.56, 3.70, and 0.13 m/s 2 , and those with MRDs are 2.87, 3.21, and 0.11 m/s 2 , which are decreased by 19.35%, 13.29%, and 12.32%, respectively. According to the differential equation of motion of the MRD damping structure [32], a control force matrix will be added because of the setting of MRDs in the structure; it is equivalent to increasing the stiffness and damping of the structure, and both of them can reduce the displacement response of the structure under the action of seismic waves; hence, by setting the MRD in the structure, the displacement control effect of the structure is very obvious, as shown in Figures 9 and 11. However, increasing the damping and stiffness of the structure has the opposite effect on the acceleration response of the structure under the action of seismic waves.…”
Section: Results Analysis On Multi-dimensional Vibration Reduction Of...mentioning
confidence: 99%
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“…During the action time of the Kobe wave, the three-directional maximum accelerations of Node 154 of the structure without MRDs are 3.56, 3.70, and 0.13 m/s 2 , and those with MRDs are 2.87, 3.21, and 0.11 m/s 2 , which are decreased by 19.35%, 13.29%, and 12.32%, respectively. According to the differential equation of motion of the MRD damping structure [32], a control force matrix will be added because of the setting of MRDs in the structure; it is equivalent to increasing the stiffness and damping of the structure, and both of them can reduce the displacement response of the structure under the action of seismic waves; hence, by setting the MRD in the structure, the displacement control effect of the structure is very obvious, as shown in Figures 9 and 11. However, increasing the damping and stiffness of the structure has the opposite effect on the acceleration response of the structure under the action of seismic waves.…”
Section: Results Analysis On Multi-dimensional Vibration Reduction Of...mentioning
confidence: 99%
“…9) and ( 10), the d sion of which is 24 × 24, as shown in Equation (11). The stiffness [32] of the shell element consists of the membrane stiffness k m e and the bending stiffness k b e . k m e , given in Equation ( 9), is used to deal with shell element membrane effects, whose corresponding DOFs are u, v and θ z ; k b e given in Equation ( 10) is used to deal with shell element bending effects, whose corresponding DOFs are w, θ x , and θ y ; k m ij and k b ij are the submatrices with the dimension of 3 × 3.…”
Section: Theory Of the Shell Elementmentioning
confidence: 99%
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“…The algorithm's rationality and the controller's effectiveness were verified by comparing the simulation results of the controllers with those of complex algorithms. Zhao et al 16 investigated the effect of MR dampers on multidimensional vibration in reinforced concrete frame structures using MATLAB software. They concluded that MR dampers could effectively reduce the dynamic responses of space frame structures.…”
Section: Introductionmentioning
confidence: 99%