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TEC
2008
2008
RM-MEDA: A Regularity Model-Based Multiobjective Estimation of Distribution Algorithm
Under mild conditions, it can be induced from the Karush-Kuhn-Tucker condition that the Pareto set, in the decision space, of a continuous multiobjective optimization problem is (m - 1)-D piecewise continuous, where m is the number of objectives. Based on this regularity property, we propose a Regularity Model based Multiobjective Estimation of Distribution Algorithm (RM-MEDA) for continuous multiobjective optimization problems with variable linkages. At each generation, the proposed algorithm models a promising area in the decision space by a probability distribution whose centroid is a (m-1)-D piecewise continuous manifold. The Local Principal Component Analysis algorithm is used for building such a model. New trial solutions are sampled from the model thus built. A nondominated sorting based selection is used for choosing solutions for the next generation. Systematic experiments have shown that, overall, RM-MEDA outperforms three other state-of-theart algorithms, namely, GDE3, PCX-N...
Real-time TrafficContinuous Multiobjective Optimization | Multiobjective Optimization Problems | TEC 2008 | Variable Linkages |
Related Content
| Added | 15 Dec 2010 |
| Updated | 15 Dec 2010 |
| Type | Journal |
| Year | 2008 |
| Where | TEC |
| Authors | Qingfu Zhang, Aimin Zhou, Yaochu Jin |
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