Reliable Real-Time Optimization of Nonconvex Systems Described by Parametrized Partial Differential Equations

• dc.contributor.author: Oliveira, I.B.
• dc.contributor.author: Patera, Anthony T.
• dc.date.issued: 2003-01
• dc.identifier.uri: http://hdl.handle.net/1721.1/3707
• dc.description.abstract: The solution of a single optimization problem often requires computationally-demanding evaluations; this is especially true in optimal design of engineering components and systems described by partial differential equations. We present a technique for the rapid and reliable optimization of systems characterized by linear-functional outputs of partial differential equations with affine parameter dependence. The critical ingredients of the method are: (i) reduced-basis techniques for dimension reduction in computational requirements; (ii) an "off-line/on-line" computational decomposition for the rapid calculation of outputs of interest and respective sensitivities in the limit of many queries; (iii) a posteriori error bounds for rigorous uncertainty and feasibility control; (iv) Interior Point Methods (IPMs) for efficient solution of the optimization problem; and (v) a trust-region Sequential Quadratic Programming (SQP) interpretation of IPMs for treatment of possibly non-convex costs and constraints.
• dc.description.sponsorship: Singapore-MIT Alliance (SMA)
• dc.format.extent: 334725 bytes
• dc.format.mimetype: application/pdf
• dc.language.iso: en_US
• dc.relation.ispartofseries: High Performance Computation for Engineered Systems (HPCES)
• dc.subject: parametrized partial differential equations
• dc.subject: reduced-basis
• dc.subject: computational decomposition
• dc.subject: a posteriori error bounds
• dc.subject: Interior Point Methods
• dc.subject: Sequential Quadratic Programming
• dc.type: Article