On improving normal boundary intersection method for generation of Pareto frontier

Gradient-based methods, including Normal Boundary Intersection (NBI), for solving multi-objective optimization problems require solving at least one optimization problem for each solution point. These methods can be computationally expensive with an increase in the number of variables and/or constraints of the optimization problem. This paper provides a modification to the original NBI algorithm so that continuous Pareto frontiers are obtained “in one go,” i.e., by solving only a single optimization problem. Discontinuous Pareto frontiers require solving a significantly fewer number of optimization problems than the original NBI algorithm. In the proposed method, the optimization problem is solved using a quasi-Newton method whose history of iterates is used to obtain points on the Pareto frontier. The proposed and the original NBI methods have been applied to a collection of 16 test problems, including a welded beam design and a heat exchanger design problem. The results show that the proposed approach significantly reduces the number of function calls when compared to the original NBI algorithm.

[1]  Tapabrata Ray,et al.  Blessings of maintaining infeasible solutions for constrained multi-objective optimization problems , 2008, 2008 IEEE Congress on Evolutionary Computation (IEEE World Congress on Computational Intelligence).

[2]  John E. Dennis,et al.  Normal-Boundary Intersection: A New Method for Generating the Pareto Surface in Nonlinear Multicriteria Optimization Problems , 1998, SIAM J. Optim..

[3]  R. S. Laundy,et al.  Multiple Criteria Optimisation: Theory, Computation and Application , 1989 .

[4]  Mokhtar S. Bazaraa,et al.  Nonlinear Programming: Theory and Algorithms , 1993 .

[5]  R. Haftka,et al.  Constrained particle swarm optimization using a bi-objective formulation , 2009 .

[6]  Edward B. Magrab,et al.  An Engineer's Guide to Matlab , 2000 .

[7]  Layne T. Watson,et al.  Multi-Objective Control-Structure Optimization via Homotopy Methods , 1993, SIAM J. Optim..

[8]  P. Siarry,et al.  Multiobjective Optimization: Principles and Case Studies , 2004 .

[9]  Jasbir S. Arora,et al.  Survey of multi-objective optimization methods for engineering , 2004 .

[10]  Kevin Tucker,et al.  Response surface approximation of pareto optimal front in multi-objective optimization , 2004 .

[11]  Carlos A. Coello Coello,et al.  Solving Hard Multiobjective Optimization Problems Using epsilon-Constraint with Cultured Differential Evolution , 2006, PPSN.

[12]  Jared L. Cohon,et al.  Multiobjective programming and planning , 2004 .

[13]  Indraneel Das On characterizing the “knee” of the Pareto curve based on Normal-Boundary Intersection , 1999 .

[14]  Shapour Azarm,et al.  Non-Gradient Based Parameter Sensitivity Estimation for Single Objective Robust Design Optimization , 2004 .

[15]  A. Messac,et al.  The normalized normal constraint method for generating the Pareto frontier , 2003 .

[16]  K. M. Ragsdell,et al.  Optimal Design of a Class of Welded Structures Using Geometric Programming , 1976 .

[17]  Shapour Azarm,et al.  A modified Benders decomposition method for efficient robust optimization under interval uncertainty , 2011 .

[18]  James Duncan,et al.  Engineers Guide to MATLAB , 2007 .

[19]  Marianthi G. Ierapetritou,et al.  Generate Pareto optimal solutions of scheduling problems using normal boundary intersection technique , 2007, Comput. Chem. Eng..

[20]  Kalyanmoy Deb,et al.  A fast and elitist multiobjective genetic algorithm: NSGA-II , 2002, IEEE Trans. Evol. Comput..

[21]  Ulf Schlichtmann,et al.  A Successive Approach to Compute the Bounded Pareto Front of Practical Multiobjective Optimization Problems , 2009, SIAM J. Optim..

[22]  S. Azarm,et al.  Improving multi-objective genetic algorithms with adaptive design of experiments and online metamodeling , 2009 .

[23]  J. Dennis,et al.  A closer look at drawbacks of minimizing weighted sums of objectives for Pareto set generation in multicriteria optimization problems , 1997 .

[24]  A. Messac,et al.  Normal Constraint Method with Guarantee of Even Representation of Complete Pareto Frontier , 2004 .