State space modeling of multi-scale variation propagation in machining process using matrix model

Multi-scale variation quality control of mechanical products has become one of research hotspots, but little research constructs variation propagation model under multi-scale error. This paper proposes an extended stream of variation (SoV) model considering geometric error by matrix model representation. New constraint conditions are introduced into the model for Monte Carlo calculation. To verify the accuracy and applicability of this model, a case study simplified from a machining process of automotive engine head is provided. The results indicate that this method has a great engineering value in machining process.

[1]  Meng Wang,et al.  Three-dimensional variation propagation modeling for multistage turning process of rotary workpieces , 2015, Comput. Ind. Eng..

[2]  Joshua U. Turner,et al.  Review of statistical approaches to tolerance analysis , 1995, Comput. Aided Des..

[3]  Umberto Prisco,et al.  Overview of current CAT systems , 2002, Integr. Comput. Aided Eng..

[4]  Hua Chen A New Approach of Constraints Establishment and Optimization for Matrix Tolerance Model , 2016 .

[5]  Alain Riviere,et al.  A matrix approach to the representation of tolerance zones and clearances , 1997 .

[6]  Qiang Huang,et al.  State space modeling of dimensional variation propagation in multistage machining process using differential motion vectors , 2003, IEEE Trans. Robotics Autom..

[7]  Jianjun Shi,et al.  Stream of Variation Modeling and Analysis for Multistage Manufacturing Processes , 2006 .

[8]  Utpal Roy,et al.  Representation and interpretation of geometric tolerances for polyhedral objects. II.: Size, orientation and position tolerances , 1999, Comput. Aided Des..

[9]  Jianjun Shi,et al.  State Space Modeling of Variation Propagation in Multistation Machining Processes Considering Machining-Induced Variations , 2012 .

[10]  Qiang Zhou,et al.  Integrating GD&T into dimensional variation models for multistage machining processes , 2010 .

[11]  Yoram Koren,et al.  Stream-of-Variation Theory for Automotive Body Assembly , 1997 .

[12]  Shiyu Zhou,et al.  Kinematic Analysis of Dimensional Variation Propagation for Multistage Machining Processes With General Fixture Layouts , 2007, IEEE Transactions on Automation Science and Engineering.