An efficient multi-objective optimization method for uncertain structures based on ellipsoidal convex model

Compared with the interval model, the ellipsoidal convex model can describe the correlation of the uncertain parameters through a multidimensional ellipsoid, and whereby excludes extreme combination of uncertain parameters and avoids over-conservative designs. In this paper, we attempt to propose an efficient multi-objective optimization method for uncertain structures based on ellipsoidal convex model. Firstly, each uncertain objective function is transformed into deterministic optimization problem by using nonlinear interval number programming (NINP) method and a possibility degree of interval number is applied to deal with the uncertain constraints. The penalty function method is suggested to transform the uncertain optimization problem into deterministic non-constrained optimization problem. Secondly, the approximation model based on radial basis function (RBF) is applied to improve computational efficiency. For ensuring the accuracy of the approximation models, a local-densifying approximation technique is suggested. Then, the micro multi-objective genetic algorithm (μMOGA) is used to optimize design parameters in the outer loop and the intergeneration projection genetic algorithm (IP-GA) is used to treat uncertain vector in the inner loop. Finally, two numerical examples and an engineering example are investigated to demonstrate the effectiveness of the present method.

[1]  R. Rackwitz,et al.  Structural reliability under combined random load sequences , 1978 .

[2]  Kalyanmoy Deb,et al.  Multi-objective optimization using evolutionary algorithms , 2001, Wiley-Interscience series in systems and optimization.

[3]  Qi Xia,et al.  Stress-based topology optimization using bi-directional evolutionary structural optimization method , 2018 .

[4]  Xin Liu,et al.  A multi-objective optimization method for uncertain structures based on nonlinear interval number programming method , 2017 .

[5]  C. Jiang,et al.  Correlation analysis of non-probabilistic convex model and corresponding structural reliability technique , 2011 .

[6]  Kaushik Sinha,et al.  Reliability-based multiobjective optimization for automotive crashworthiness and occupant safety , 2007 .

[7]  Sudhakar Arepally,et al.  ASSESSING THE SAFETY PERFORMANCE OF OCCUPANT RESTRAINT SYSTEMS. IN: SEAT BELTS: THE DEVELOPMENT OF AN ESSENTIAL SAFETY FEATURE , 1990 .

[8]  Gui-rong Liu,et al.  Computational Inverse Techniques in Nondestructive Evaluation , 2003 .

[9]  Zhen Luo,et al.  A new multi-objective programming scheme for topology optimization of compliant mechanisms , 2009 .

[10]  Ramon E. Moore Methods and applications of interval analysis , 1979, SIAM studies in applied mathematics.

[11]  Raphael T. Haftka,et al.  Surrogate-based Analysis and Optimization , 2005 .

[12]  Yakov Ben-Haim,et al.  A non-probabilistic concept of reliability , 1994 .

[13]  B. Sudret,et al.  Reliability-based design optimization using kriging surrogates and subset simulation , 2011, 1104.3667.

[14]  Xu Han,et al.  Uncertain optimization of composite laminated plates using a nonlinear interval number programming method , 2008 .

[15]  T. Simpson,et al.  Comparative studies of metamodelling techniques under multiple modelling criteria , 2001 .

[16]  Zhiyong Zhang,et al.  A hybrid reliability approach for structure optimisation based on probability and ellipsoidal convex models , 2014 .

[17]  Nong Zhang,et al.  Interval multi-objective optimisation of structures using adaptive Kriging approximations , 2013 .

[18]  A. Kareem,et al.  Reliability-based topology optimization of uncertain building systems subject to stochastic excitation , 2017 .

[19]  Zissimos P. Mourelatos,et al.  A Single-Loop Approach for System Reliability-Based Design Optimization , 2006, DAC 2006.

[20]  I. Elishakoff,et al.  Convex models of uncertainty in applied mechanics , 1990 .

[21]  Z. Kang,et al.  Reliability-based structural optimization with probability and convex set hybrid models , 2010 .

[22]  Masoud Rais-Rohani,et al.  A comparative study of metamodeling methods for multiobjective crashworthiness optimization , 2005 .

[23]  Ravi C. Penmetsa,et al.  Bounds on structural system reliability in the presence of interval variables , 2007 .

[24]  M. Papadrakakis,et al.  Multi-objective design optimization using cascade evolutionary computations , 2005 .

[25]  G. P. Liu,et al.  A novel multi-objective optimization method based on an approximation model management technique , 2008 .

[26]  Z. Kang,et al.  Continuum topology optimization with non-probabilistic reliability constraints based on multi-ellipsoid convex model , 2009 .

[27]  I. M. Stancu-Minasian,et al.  Stochastic Programming: with Multiple Objective Functions , 1985 .

[28]  Farrokh Mistree,et al.  Kriging Models for Global Approximation in Simulation-Based Multidisciplinary Design Optimization , 2001 .

[29]  G. P. Liu,et al.  A nonlinear interval number programming method for uncertain optimization problems , 2008, Eur. J. Oper. Res..

[30]  Xu Han,et al.  A nonlinear interval-based optimization method with local-densifying approximation technique , 2010 .

[31]  Franck Schoefs,et al.  Global kriging surrogate modeling for general time-variant reliability-based design optimization problems , 2018 .

[32]  Yuo-Tern Tsai,et al.  Reliability design optimisation for practical applications based on modelling processes , 2013 .

[33]  I. Elishakoff,et al.  Antioptimization of structures with large uncertain-but-non-random parameters via interval analysis , 1998 .