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A Direct Method for Parabolic PDE Constrained Optimization ProblemsIntroduction

A Direct Method for Parabolic PDE Constrained Optimization Problems: Introduction [Mathematics today permeates an ever increasing part of the sciences far beyond mathematical physics just as about 50 years ago Nobel Prize laureate Wigner has hoped for. In particular mathematical methods for simulation and optimization of quantitative mathematical models continue to face growing demand in disciplines ranging from engineering, biology, economics, physics, etc. even to emerging areas of psychology or archeology (see, e.g., Sager et al. [139], Schäfer et al. [140]).] http://www.deepdyve.com/assets/images/DeepDyve-Logo-lg.png

A Direct Method for Parabolic PDE Constrained Optimization ProblemsIntroduction

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Publisher
Springer Fachmedien Wiesbaden
Copyright
© Springer Fachmedien Wiesbaden 2014
ISBN
978-3-658-04475-6
Pages
1 –8
DOI
10.1007/978-3-658-04476-3_1
Publisher site
See Chapter on Publisher Site

Abstract

[Mathematics today permeates an ever increasing part of the sciences far beyond mathematical physics just as about 50 years ago Nobel Prize laureate Wigner has hoped for. In particular mathematical methods for simulation and optimization of quantitative mathematical models continue to face growing demand in disciplines ranging from engineering, biology, economics, physics, etc. even to emerging areas of psychology or archeology (see, e.g., Sager et al. [139], Schäfer et al. [140]).]

Published: Nov 30, 2013

Keywords: Sequential Quadratic Programming; Quadratic Program Problem; Bacterial Chemotaxis; Sequential Quadratic Programming Method; Inexact Newton Method

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