Redundant robust topology optimization of truss

A common problem in the optimization of structures is the handling of uncertainties in the parameters. If the parameters appear in the constraints, the uncertainties can lead to an infinite number of constraints. Usually the constraints have to be approximated by finite expressions to generate a computable problem. Here, using the example of topology optimization of a truss, a method is proposed to deal with such uncertainties by utilizing robust optimization techniques. This leads to an approach without the necessity of any approximation.Another common problem in the optimization of structures is the consideration of possible damages. The typical approach is to prevent these damages by a convenient structure—this concept is known as safe-life. The method developed here applies the principle of redundancy to resist damages, which is the design philosophy of fail-safe. In general this leads to a high dimensional partitioning problem. By using a linear ansatz we get a computable problem.Finally, robust and redundant methods are combined, and simple numerical examples of typical problems illustrate the application of the methods.Our new redundant robust topology optimization of truss, based on known concepts of different research fields, gives a structure which is not only “safe” for parameter perturbations but for failure of bars, too. This introduces the fail-safe concept to structural optimization.

[1]  Yoshihiro Kanno,et al.  Global optimization of robust truss topology via mixed integer semidefinite programming , 2010 .

[2]  Dan M. Frangopol,et al.  Reliability-based design of MEMS mechanisms by topology optimization , 2003 .

[3]  Kurt Marti,et al.  Stochastic optimization methods in optimal engineering design under stochastic uncertainty , 2003 .

[4]  R. J. Dakin,et al.  A tree-search algorithm for mixed integer programming problems , 1965, Comput. J..

[5]  Sven Leyffer,et al.  Solving Large MINLPs on Computational Grids , 2002 .

[6]  Allen L. Soyster,et al.  Technical Note - Convex Programming with Set-Inclusive Constraints and Applications to Inexact Linear Programming , 1973, Oper. Res..

[7]  Masaru Hoshiya,et al.  Redundancy Index of Lifeline Systems , 2002 .

[8]  Randy H. Katz,et al.  A case for redundant arrays of inexpensive disks (RAID) , 1988, SIGMOD '88.

[9]  Fazlollah M. Reza,et al.  Introduction to Information Theory , 2004, Lecture Notes in Electrical Engineering.

[10]  Ralph E. Gomory,et al.  An algorithm for integer solutions to linear programs , 1958 .

[11]  A. Michell LVIII. The limits of economy of material in frame-structures , 1904 .

[12]  J. Neumann,et al.  Theory of games and economic behavior , 1945, 100 Years of Math Milestones.

[13]  F. Belzunce,et al.  On optimal allocation of redundant components for series and parallel systems of two dependent compo , 2011 .

[14]  Werner Heise,et al.  Informations- und Codierungstheorie , 1983 .

[15]  M. Bendsøe,et al.  Optimization methods for truss geometry and topology design , 1994 .

[16]  C. E. SHANNON,et al.  A mathematical theory of communication , 1948, MOCO.

[17]  Bernhard Sendhoff,et al.  Robust Optimization - A Comprehensive Survey , 2007 .

[18]  Java Binding,et al.  GNU Linear Programming Kit , 2011 .

[19]  Arkadi Nemirovski,et al.  Robust Convex Optimization , 1998, Math. Oper. Res..

[20]  Harvey J. Greenberg,et al.  Automatic design of optimal structures , 1964 .

[21]  Giuseppe Carlo Calafiore,et al.  Optimization under uncertainty with applications to design of truss structures , 2008 .

[22]  A. Land,et al.  An Automatic Method for Solving Discrete Programming Problems , 1960, 50 Years of Integer Programming.

[23]  J. S. Przemieniecki Theory of matrix structural analysis , 1985 .

[24]  Daniel P. Mohr,et al.  Robust Topology Optimization of Truss with regard to Volume , 2011, ArXiv.

[25]  I. Doltsinis,et al.  ROBUST DESIGN OF STRUCTURES USING OPTIMIZATION METHODS , 2004 .

[26]  Arkadi Nemirovski,et al.  Robust Truss Topology Design via Semidefinite Programming , 1997, SIAM J. Optim..

[27]  Gérard Cornuéjols,et al.  Valid inequalities for mixed integer linear programs , 2007, Math. Program..

[28]  Kalman Žiha,et al.  Redundancy and Robustness of Systems of Events , 2000 .

[29]  J. Taylor An Introduction to Error Analysis , 1982 .