Computational modeling research centers around developing ever better representations of physics. The objective of model reduction specialists is to take that high fidelity understanding and compress it into a Reduced Order Model (ROM) capable of replicating the physical accuracy of the more complicated model with a significantly reduced computational cost. A current challenge in reduced order modeling is the presence of linear inequality constraints in optimization problems. Constrained optimization problems arise in design, contact modeling, financial engineering and other subfields of mathematical modeling. As such, there is a strong motivation to leverage the repeatability of ROMs to rapidly address these engineering challenges. Inheren...
Optimization problems with many more inequality constraints than variables arise in support-vector m...
Many engineering problems boil down to solving partial differential equations (PDEs) that describe r...
Many traditional physical problems are known to be ill-defined: a tiny change in the initial conditi...
Computational modeling research centers around developing ever better representations of physics. Th...
An adaptive approach to using reduced-order models as surrogates in PDE-constrained optimization is ...
In PDE constrained optimization, physical parameters need to be determined so that some objective fu...
The optimization and control of systems governed by partial differential equations (PDEs) usually re...
Design optimization problems are often formulated as an optimization problem whose objective is a fu...
An extension of the Nelder-Mead simplex algorithm is presented in this dissertation. The algorithm ...
The need for eliminating redundancies in systems of linear inequalities arises in many applications....
Abstract — Optimization-ready reduced-order models should target a particular output functional, spa...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/96...
Many engineering problems boil down to solving partial differential equations (PDEs) that describe r...
Linear Programming is a mathematical technique to help plan and to achieve the best outcome. It will...
An optimization algorithm for minimizing a smooth function over a convex set is de-scribed. Each ite...
Optimization problems with many more inequality constraints than variables arise in support-vector m...
Many engineering problems boil down to solving partial differential equations (PDEs) that describe r...
Many traditional physical problems are known to be ill-defined: a tiny change in the initial conditi...
Computational modeling research centers around developing ever better representations of physics. Th...
An adaptive approach to using reduced-order models as surrogates in PDE-constrained optimization is ...
In PDE constrained optimization, physical parameters need to be determined so that some objective fu...
The optimization and control of systems governed by partial differential equations (PDEs) usually re...
Design optimization problems are often formulated as an optimization problem whose objective is a fu...
An extension of the Nelder-Mead simplex algorithm is presented in this dissertation. The algorithm ...
The need for eliminating redundancies in systems of linear inequalities arises in many applications....
Abstract — Optimization-ready reduced-order models should target a particular output functional, spa...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/96...
Many engineering problems boil down to solving partial differential equations (PDEs) that describe r...
Linear Programming is a mathematical technique to help plan and to achieve the best outcome. It will...
An optimization algorithm for minimizing a smooth function over a convex set is de-scribed. Each ite...
Optimization problems with many more inequality constraints than variables arise in support-vector m...
Many engineering problems boil down to solving partial differential equations (PDEs) that describe r...
Many traditional physical problems are known to be ill-defined: a tiny change in the initial conditi...