Robust Multiobjective Optimization Through Collaborative Optimization and Linear Physical Programming

McAllister, Charles D.; Simpson, Timothy W.; Lewis, Kemper; Messac, Achille

doi:10.2514/6.2004-4549

Cited by 19 publications

(10 citation statements)

References 34 publications

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“…The limitation of this method is that only one solution is obtained and that this solution is not necessarily Pareto-optimal. Recently, McAllister et al (2004McAllister et al ( , 2005 extended their work by integrating linear physical programming (Messac 1996) into their multi-objective collaborative optimization approach (McAllister et al 2000). However, formulation of the subspace objective functions creates some convergence problems within the collaborative optimization process developed by Braun (1996).…”

Section: Multidisciplinary and Collaborative Optimizationmentioning

confidence: 98%

An interactive multi-objective algorithm for decentralized decision making in product design

2011

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To remain competitive and gain new shares of the market, industries must develop their products quickly while meeting the multiple customer requirements. To reduce product development time, the design step is often accomplished by several working groups working in parallel. These working groups are often decentralized and are supervised by a director. This paper focuses on solving a multi-objective problem in a setting that is called a "decentralized environment." Collaborative optimization is a strategy used for solving problems in a decentralized environment. This strategy divides a problem into subproblems in order to give more autonomy to working groups, thus facilitating work in parallel. In this paper, collaborative optimization is paired with an interactive algorithm to solve multi-objective problems in a decentralized environment. It can be easily adjusted within the structure of a development process in a given industry and allows collaboration between the director and his/her working groups. The algorithm captures the director's and the working groups' preferences and generates several Pareto-optimal solutions. The algorithm was tested on a two-bar structure problem. The results obtained match those published in the literature.

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Section: Multidisciplinary and Collaborative Optimizationmentioning

confidence: 98%

An interactive multi-objective algorithm for decentralized decision making in product design

2011

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“…The motivations for the use of collaborative optimization are multiple [18]. Genetic algorithms have been chosen because of their robustness, their capacity to explore the design variable space and the possibility they provide to the designer to stop the process after a fixed number of iterations.…”

Section: Mdo and Evolutionary Algorithmsmentioning

confidence: 99%

Collaborative optimization of complex systems: a multidisciplinary approach

Rabeau

Dépincé

Bennis

2007

Int J Interact Des Manuf

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Engineering design of complex systems is a decision making process that aims at choosing from among a set of options that implies an irrevocable allocation of resources. It is inherently a multidisciplinary and multiobjective process; nowadays, the designer has to face the continuous growing complexity of engineering problems, but also, the increasing economic competition that have led to a specialization and distribution of knowledge, expertise, tools and work sites. Products become more and more complex and their design is usually of large scale, characterized by an important number of design variables, parameters, requirements, constraints and objectives. Consequently, multiobjective optimization (MOO) and multidisciplinary design optimization (MDO) are more and more used to provide one optimal solution-by the use of a "a priori" or interactive preferences modelling-or a set of optimal solutions -in which the designer will have to choose "a posteriori" the one to be developed. The objective of this paper is to present an original and efficient Collaborative Optimization Strategy for Multi-Objective Systems (COSMOS) designed to find the sub-set of the design space that contains the best solutionsPareto frontier -of the global system.

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“…The most common system decomposition methodology for complex large-scale systems is the multidisciplinary design optimization (MDO) based on the individual disciplinary feasible (IDF) approach (McAllister et al, 2004). To date, this methodology was applied mostly for applications solved with deterministic optimization methods.…”

Section: Industrial System Decompositionmentioning

confidence: 99%

Dynamic multiobjective optimization of large-scale industrial production systems: An emerging strategy

Benali

Hammache

Aubé

et al. 2007

Int. J. Energy Res.

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SUMMARYThe large industrial production systems face several conflicting challenges of energy efficiency improvements, lower consumption of raw materials per unit of production, extending the product durability, minimizing the environmental impacts, and cautious use of natural resources. In this context it is well obvious that the optimization problem is multiobjective in nature. The paper emphasizes critical review of optimization methods of large-scale industrial production systems and presentation of a novel systematic multiobjective and multiscale optimization methodology based mainly on a combined local optimality search with global optima determination, and advanced system decomposition and constraint handling. # Her Majesty the Queen in Right of Canada, as represented by the Minister of Natural Resources, 2007.

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Robust Multiobjective Optimization Through Collaborative Optimization and Linear Physical Programming

Cited by 19 publications

References 34 publications

An interactive multi-objective algorithm for decentralized decision making in product design

An interactive multi-objective algorithm for decentralized decision making in product design

Collaborative optimization of complex systems: a multidisciplinary approach

Dynamic multiobjective optimization of large-scale industrial production systems: An emerging strategy

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