Time-Dependent Reliability Analysis for Function Generator Mechanisms

A function generator mechanism links its motion output and motion input with a desired functional relationship. The probability of realizing such functional relationship is the kinematic reliability. The time-dependent kinematic reliability is desired because it provides the reliability over the time interval where the functional relationship is defined. But the methodologies of time-dependent reliability are currently lacking for function generator mechanisms. We propose a mean value first-passage method for time-dependent reliability analysis. With the assumption of normality for random dimension variables with small variances, the motion error becomes a nonstationary Gaussian process. We at first derive analytical equations for upcrossing and downcrossing rates and then develop a numerical procedure that integrates the two rates to obtain the kinematic reliability. A four-bar function generator is used as an example. The proposed method is accurate and efficient for normally distributed dimension variables with small variances.

[1]  S. Rice Mathematical analysis of random noise , 1944 .

[2]  D. Middleton An Introduction to Statistical Communication Theory , 1960 .

[3]  Sanjay G. Dhande,et al.  Analysis and Synthesis of Mechanical Error in Linkages—A Stochastic Approach , 1973 .

[4]  V. I. Sergeyev Methods for mechanism reliability calculation , 1974 .

[5]  A. C. Rao Synthesis of 4-bar function-generators using geometric programming , 1979 .

[6]  S. Dubowsky,et al.  An Analytical and Experimental Study of the Prediction of Impacts in Planar Mechanical Systems With Clearances , 1984 .

[7]  Joseph R Baumgarten,et al.  A probabilistic study relating to tolerancing and path generation error , 1985 .

[8]  Z. Huang Error analysis of position and orientation in robot manipulators , 1987 .

[9]  K. Breitung Asymptotic crossing rates for stationary Gaussian vector processes , 1988 .

[10]  R. Rackwitz,et al.  Outcrossing rates of marked poisson cluster processes in structural reliability , 1988 .

[11]  Singiresu S Rao,et al.  Reliability Analysis of Robot Manipulators , 1988 .

[12]  Xu Wei-Liang,et al.  Probabilistic analysis and Monte Carlo simulation of the kinematic error in a spatial linkage , 1989 .

[13]  Pardeep Kumar Bhatti Probabilistic modeling and optimal design of robotic manipulators , 1989 .

[14]  Ø. Hagen,et al.  VECTOR PROCESS OUT-CROSSING AS PARALLEL SYSTEM SENSITIVITY MEASURE , 1991 .

[15]  K. Kurien Issac A Nondifferentiable Optimization Algorithm for Constrained Minimax Linkage Function Generation , 1993 .

[16]  Larry L. Howell,et al.  Reliability-based optimal design of a bistable compliant mechanism , 1993 .

[17]  A. K. Mallik,et al.  Kinematic Analysis and Synthesis of Mechanisms , 1994 .

[18]  Tzong-Shi Liu,et al.  A reliability approach to evaluating robot accuracy performance , 1994 .

[19]  E. Amezua,et al.  Nonlinear optimization of planar linkages for kinematic syntheses , 1995 .

[20]  Sundar Krishnamurty,et al.  A generalized exact gradient method for mechanism synthesis , 1996 .

[21]  Z Shi Synthesis of mechanical error in spatial linkages based on reliability concept , 1997 .

[22]  C. Guedes Soares Probabilistic methods for structural design , 1997 .

[23]  Jianmin Zhu,et al.  Uncertainty analysis of planar and spatial robots with joint clearances , 2000 .

[24]  S. S. Rao,et al.  Probabilistic approach to manipulator kinematics and dynamics , 2001, Reliab. Eng. Syst. Saf..

[25]  R. Rackwitz Reliability analysis—a review and some perspectives , 2001 .

[26]  P. A. Simionescu,et al.  Optimum synthesis of the four-bar function generator in its symmetric embodiment: the Ackermann steering linkage , 2002 .

[27]  Mark R. Cutkosky,et al.  Error Analysis for the In-Situ Fabrication of Mechanisms , 2003 .

[28]  Shahram Sarkani,et al.  Random Vibrations: Analysis of Structural and Mechanical Systems , 2003 .

[29]  Bruno Sudret,et al.  The PHI2 method: a way to compute time-variant reliability , 2004, Reliab. Eng. Syst. Saf..

[30]  Vincenzo Parenti-Castelli,et al.  Clearance influence analysis on mechanisms , 2005 .

[31]  Qiang Cheng,et al.  Robust synthesis of path generating linkages , 2005 .

[32]  Chen Jian-jun,et al.  Reliability analysis of kinematic accuracy for the elastic slider-crank mechanism , 2006 .

[33]  John E. Renaud,et al.  Reliability-Based Design Optimization of Robotic System Dynamic Performance , 2007 .

[34]  Jianbing Chen,et al.  The equivalent extreme-value event and evaluation of the structural system reliability , 2007 .

[35]  Jianbing Chen,et al.  The extreme value distribution and dynamic reliability analysis of nonlinear structures with uncertain parameters , 2007 .

[36]  Ming-June Tsai,et al.  Accuracy analysis of a multi-loop linkage with joint clearances , 2008 .

[37]  Bruno Sudret,et al.  Analytical derivation of the outcrossing rate in time-variant reliability problems , 2008 .

[38]  Zissimos P. Mourelatos,et al.  Time-Dependent Reliability Estimation for Dynamic Problems Using a Niching Genetic Algorithm , 2009 .

[39]  Xiaoping Du,et al.  Robust Mechanism synthesis with random and interval variables , 2009 .

[40]  Shahram Sarkani,et al.  Reliability Analysis of Systems Subject to First-Passage Failure , 2009 .

[41]  Kenneth W. Chase,et al.  Direct Linearization Method Kinematic Variation Analysis , 2010 .

[42]  B. Kang,et al.  Stochastic approach to kinematic reliability of open-loop mechanism with dimensional tolerance , 2010 .