A convex relaxation for the time-optimal trajectory planning of robotic manipulators along predetermined geometric paths

Reynoso-Mora, Pedro; Chen, W.; Tomizuka, Masayoshi

doi:10.1002/oca.2234

Cited by 21 publications

(12 citation statements)

References 17 publications

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“…Then Ardeshiri et al [9] extended the works of [8] to realize trajectory planning under complete dynamic model with coulomb and viscous friction. Similar improved works can be also found in Reynoso-Mora et al [10]. However, none of these works considered the machining performance along the optimized trajectory.…”

Section: Introductionsupporting

confidence: 60%

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Practical feedrate optimization for planar high precision contouring

Zhang

Gao

2016

2016 IEEE International Conference on Information and Automation (ICIA)

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The feedrate planning problem of robotics and computer numerical control (CNC) systems is discussed in this paper for realizing planar high precision contouring in minimum time. Besides of the usually considered velocity, acceleration and jerk constraints, a contour error estimation function is also introduced to drive the feedrate planning problem. By directly confining the estimated contour error curve of the feedrate trajectory, high precision contouring is obtained in real machining. The novelty of the proposed method is that a computationally efficient convex optimization approach is proposed to solve this complex nonlinear dynamic optimization problem. Several numerical experiments are implemented to demonstrate the practicability and effectiveness of the proposed approach.

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Section: Introductionsupporting

confidence: 60%

“…According to [10], nonlinear equality constraint q s = √ q can be replaced by the inequality constraint…”

Section: A Constraint Convex Relaxationmentioning

confidence: 99%

Practical feedrate optimization for planar high precision contouring

Zhang

Gao

2016

2016 IEEE International Conference on Information and Automation (ICIA)

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“…They propose a convex relaxation method to complete the optimal trajectory and feed-forward control, which is applied to solve the nonconvex problem of the manipulator. 13,23 But this method does not consider the effect of Stribeck friction. Some studies only consider the influence of the viscous friction effect on the motion trajectory.…”

Section: Introductionmentioning

confidence: 99%

Nonlinear friction dynamic modeling and performance analysis of flexible parallel robot

Zhao

et al. 2020

International Journal of Advanced Robotic Systems

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The article presents a friction dynamic modeling method for a flexible parallel robot considering the characteristics of nonlinear friction. An approximate friction model which is proposed by Kostic et al. is applied to establish the dynamic model with Lagrange method. Parameters identification is completed by least square method, and the tracking accuracy and the stability of the robot are systematically analyzed before and after dynamic compensation at different speeds. Its position error of the robot after compensation is only 0.98 mm at low speed. The accuracy is improved 10 times than that before compensation. In addition, the peak velocity errors are 3.97 mm·s−1 and 1.49 mm·s−1 at high and low speed, respectively, which are reduced 2.5 times than that before compensation. The experimental data also indicate that velocity tracking curve has no obvious peak error compared with the common method based on Coulomb and viscous friction model. The curve is much smoother with proposed model, and the motion stability of robot at high speed has been greatly improved. The proposed method just needs the robot to collect some positions before path tracing, and the parameters identification of dynamic model can be completed quickly. The compensation effect is much more better than common method. So the proposed method can be extended to complete the dynamic identification for complex robot with more joints. It is helpful to further improve the stability and the accuracy at high speed.

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“…Time optimal control problems' aim is driving systems from an initial state to a desired final state in minimum time while satisfying given constraints. To this day, time optimal control problem still attracts interest among researchers [1][2][3].…”

Section: Introductionmentioning

confidence: 99%

Time Optimal Control Laws for Bilinear Systems

Bichiou

Bouafoura

Braïek

2018

Mathematical Problems in Engineering

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The aim of this paper is to determine the feedforward and state feedback suboptimal time control for a subset of bilinear systems, namely, the control sequence and reaching time. This paper proposes a method that uses Block pulse functions as an orthogonal base. The bilinear system is projected along that base. The mathematical integration is transformed into a product of matrices. An algebraic system of equations is obtained. This system together with specified constraints is treated as an optimization problem. The parameters to determine are the final time, the control sequence, and the states trajectories. The obtained results via the newly proposed method are compared to known analytical solutions.

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A convex relaxation for the time-optimal trajectory planning of robotic manipulators along predetermined geometric paths

Cited by 21 publications

References 17 publications

Practical feedrate optimization for planar high precision contouring

Practical feedrate optimization for planar high precision contouring

Nonlinear friction dynamic modeling and performance analysis of flexible parallel robot

Time Optimal Control Laws for Bilinear Systems

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