Applications of fuzzy theories to multi-objective system optimization

Most of the computer aided design techniques developed so far deal with the optimization of a single objective function over the feasible design space. However, there often exist several engineering design problems which require a simultaneous consideration of several objective functions. This work presents several techniques of multiobjective optimization. In addition, a new formulation, based on fuzzy theories, is also introduced for the solution of multiobjective system optimization problems. The fuzzy formulation is useful in dealing with systems which are described imprecisely using fuzzy terms such as, 'sufficiently large', 'very strong', or 'satisfactory'. The proposed theory translates the imprecise linguistic statements and multiple objectives into equivalent crisp mathematical statements using fuzzy logic. The effectiveness of all the methodologies and theories presented is illustrated by formulating and solving two different engineering design problems. The first one involves the flight trajectory optimization and the main rotor design of helicopters. The second one is concerned with the integrated kinematic-dynamic synthesis of planar mechanisms. The use and effectiveness of nonlinear membership functions in fuzzy formulation is also demonstrated. The numerical results indicate that the fuzzy formulation could yield results which are qualitatively different from those provided by the crisp formulation. It is felt that the fuzzy formulation will handle real life design problems on a more rational basis.

[1]  R. L. Keeney,et al.  Decisions with Multiple Objectives: Preferences and Value Trade-Offs , 1977, IEEE Transactions on Systems, Man, and Cybernetics.

[2]  R. R. Ager Multiple Objective Decision-Making Using Fuzzy Sets , 1977, Int. J. Man Mach. Stud..

[3]  Singiresu S. Rao Multi‐objective optimization of fuzzy structural systems , 1987 .

[4]  T. Keelin A Parametric Representation of Additive Value Functions , 1981 .

[5]  S. N. Kramer,et al.  A Computer-Aided Design Technique for the Synthesis of Planar Four Bar Mechanisms Satisfying Specified Kinematic and Dynamic Conditions , 1988 .

[6]  T. L. Vincent,et al.  Game Theory as a Design Tool , 1983 .

[7]  H. Zimmermann DESCRIPTION AND OPTIMIZATION OF FUZZY SYSTEMS , 1975 .

[8]  H. Zimmermann Fuzzy programming and linear programming with several objective functions , 1978 .

[9]  Singiresu S. Rao,et al.  Nonlinear Membership Functions in Multiobjective Fuzzy Optimization of Mechanical and Structural Systems , 1992 .

[10]  Singiresu S Rao,et al.  Multiobjective decision making in a fuzzy environment with applications to helicopter design , 1990 .

[11]  L. A. Schmit,et al.  Structural synthesis - Its genesis and development , 1981 .

[12]  Rakesh K. Sarin,et al.  RELATIVE RISK AVERSION. , 1982 .

[13]  I. Shruster,et al.  Approximation to the optimization of a coast-glide trajectory , 1983 .

[14]  G. W. Evans,et al.  An Overview of Techniques for Solving Multiobjective Mathematical Programs , 1984 .

[15]  S. Deming Multiple-criteria optimization , 1991 .

[16]  L. R. Jenkinson,et al.  The Determination of Optimum Flight Profiles for Short-Haul Routes , 1985 .

[17]  H. Miura Overview: Applications of numerical optimization methods to helicopter design problems , 1984 .

[18]  Herbert Moskowitz,et al.  ASSESSMENT OF MULTIATTRIBUTED MEASURABLE VALUE AND UTILITY FUNCTIONS VIA MATHEMATICAL PROGRAMMING , 1985 .

[19]  Singiresu S Rao,et al.  Integrated optimal design of planar mechanisms using fuzzy theories , 1989 .

[20]  Donald L. Bartel,et al.  The Optimum Design of Mechanical Systems With Competing Design Objectives , 1974 .

[21]  Han Chi-Yeh,et al.  A general method for the optimum design of mechanisms , 1966 .

[22]  Wang Guang-yuan,et al.  FUZZY OPTIMUM DESIGN OF STRUCTURES , 1985 .

[23]  Peretz P. Friedmann,et al.  Optimum design of rotor blades for vibration reduction in forward flight , 1984 .

[24]  K. D. Willmert,et al.  Optimum Design of Curve-Generating Linkages With Inequality Constraints , 1967 .

[25]  Singiresu S Rao,et al.  Multiobjective optimization in structural design with uncertain parameters and stochastic processes , 1984 .

[26]  Singiresu S Rao,et al.  PARETO-OPTIMAL SOLUTIONS IN HELICOPTER DESIGN PROBLEMS , 1990 .

[27]  R. Bielawa,et al.  Techniques for stability analysis and design optimization with dynamic constraints of nonconservative linear systems , 1971 .

[28]  Singiresu S Rao,et al.  OPTIMAL BALANCING OF HIGH-SPEED LINKAGES USING MULTIOBJECTIVE PROGRAMMING TECHNIQUES. , 1986 .

[29]  Jerry T. Pugh Synthesis of Pareto Optimal Four-Bar Function Generators With Optimum Structural Error and Optimum Transmission Angles , 1984 .

[30]  R. W. Mayne,et al.  Optimum Mechanism Design Combining Kinematic and Dynamic-Force Considerations , 1975 .

[31]  Milton A Schwartzberg,et al.  Single-Rotor Helicopter Design and Performance Estimation Programs. Volume I. Methodology. , 1977 .

[32]  K. M. Ragsdell,et al.  A Survey of Optimization Methods Applied to the Design of Mechanisms , 1976 .

[33]  R. Soland MULTICRITERIA OPTIMIZATION: A GENERAL CHARACTERIZATION OF EFFICIENT SOLUTIONS* , 1979 .

[34]  W. Z. Stepniewski,et al.  Multivariate Search and Its Application to Aircraft Design Optimisation , 1970, The Aeronautical Journal (1968).

[35]  R. Rosenthal Concepts, Theory, and Techniques PRINCIPLES OF MULTIOBJECTIVE OPTIMIZATION* , 1985 .

[36]  Hirokazu Miura,et al.  Applications of numerical optimization methods to helicopter design problems: A survey , 1984 .

[37]  G. G. Lowen,et al.  Theory of Shaking Moment Optimization of Force-Balanced Four-Bar Linkages , 1971 .

[38]  Singiresu S Rao,et al.  OPTIMUM DESIGN OF SHOCK AND VIBRATION ISOLATION SYSTEMS USING GAME THEORY , 1980 .

[39]  Holt Ashley,et al.  On Making Things the Best-Aeronautical Uses of Optimization , 1982 .

[40]  Lotfi A. Zadeh,et al.  Outline of a New Approach to the Analysis of Complex Systems and Decision Processes , 1973, IEEE Trans. Syst. Man Cybern..

[41]  H. Miura,et al.  Application of fuzzy theories to formulation of multi-objective design problems , 1988 .

[42]  Singiresu S. Rao Description and Optimum Design of Fuzzy Mechanical Systems , 1987 .

[43]  Richard Bellman,et al.  Decision-making in fuzzy environment , 2012 .

[44]  Feng Ying-jun,et al.  A method using fuzzy mathematics to solve the vectormaximum problem , 1983 .

[45]  E. Hannan Linear programming with multiple fuzzy goals , 1981 .