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'''Design optimization''' is an engineering design
<ref name="edo2021">{{Cite book|url=http:// <ref name="pyp2017">{{Cite book|url=http://principlesofoptimaldesign.org/|title=Principles of Optimal Design: Modeling and Computation|last1=Papalambros|first1=Panos Y.|last2=Wilde|first2=Douglass J.|date=2017-01-31|publisher=Cambridge University Press|isbn=9781316867457|language=en}}</ref>
# [[Variable (mathematics)|Variables]]: Describe the design alternatives
# Objective: Elected functional combination of variables (to be maximized or minimized)
# Constraints: Combination of Variables expressed as equalities or inequalities that must be satisfied for any acceptable design alternative
# Feasibility: Values for set of variables that satisfies all constraints and minimizes/maximizes Objective.
== Design optimization problem ==
{{Main|Optimization problem}}
The formal mathematical ([[Canonical form|standard form]]) statement of the design optimization problem is <ref>{{Cite book|url=https://web.stanford.edu/~boyd/cvxbook/bv_cvxbook.pdf|title=Convex Optimization|
<math>\begin{align}
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* <math>h_i(x)</math> are <math>m_1</math>'''equality constraints'''
* <math>g_j(x)</math> are <math>m_2</math> '''inequality constraints'''
* <math>X</math> is a set constraint that includes additional restrictions on <math>x</math> besides those implied by the equality and inequality constraints.
The problem formulation stated above is a convention called the ''negative null form'', since all constraint function are expressed as equalities and negative inequalities with zero on the right-hand side. This convention is used so that numerical algorithms developed to solve design optimization problems can assume a standard expression of the mathematical problem.
We can introduce the vector-valued functions
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\end{align}
</math> ''
to rewrite the above statement in the compact expression
<math>\begin{align}
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\end{align}</math>
We call <math>h, g</math> the ''set'' or ''system of'' (''functional'') ''constraints'' and <math>X</math> the ''set constraint''.
== Application ==
Design optimization applies the methods of [[mathematical optimization]] to design problem formulations and it is sometimes used interchangeably with the term [[engineering optimization]].
'''Optimization Checklist''' <ref name="pyp2017" />
* Problem Identification
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A detailed and rigorous description of the stages and practical applications with examples can be found in the book [http://www.cambridge.org/gh/academic/subjects/engineering/control-systems-and-optimization/principles-optimal-design-modeling-and-computation-3rd-edition?format=HB&isbn=9781107132672#C3r6r6aLRe2bUoef.97 Principles of Optimal Design].
Practical design optimization problems are typically solved numerically and many [[:Category:Mathematical optimization software|optimization software]] exist in academic and commercial forms.<ref>{{Cite book|url=https://books.google.com/books?
One modern application of design optimization is structural design optimization (SDO) is in building and construction sector. SDO emphasizes automating and optimizing structural designs and dimensions to satisfy a variety of performance objectives. These advancements aim to optimize the configuration and dimensions of structures to optimize augmenting strength, minimize material usage, reduce costs, enhance energy efficiency, improve sustainability, and optimize several other performance criteria. Concurrently, structural design automation endeavors to streamline the design process, mitigate human errors, and enhance productivity through computer-based tools and optimization algorithms. Prominent practices and technologies in this ___domain include the parametric design, generative design, building information modelling (BIM) technology, machine learning (ML), and artificial intelligence (AI), as well as integrating finite element analysis (FEA) with simulation tools.<ref>Towards BIM-Based Sustainable Structural Design Optimization: A Systematic Review and Industry Perspective. Sustainability 2023, 15, 15117. https://doi.org/10.3390/su152015117</ref>
== References ==▼
<references />▼
== Journals ==
* [http://manufacturingscience.asmedigitalcollection.asme.org/issue.aspx?journalid=125&issueid=27495 Journal of Engineering for Industry]
* [http://mechanicaldesign.asmedigitalcollection.asme.org/journal.aspx Journal of Mechanical Design]
* [http://mechanicaldesign.asmedigitalcollection.asme.org/issue.aspx?journalid=126&issueid=28068 Journal of Mechanisms, Transmissions, and Automation in Design]
* [https://www.cambridge.org/core/journals/design-science Design Science]
* [https://www.tandfonline.com/toc/geno20/current Engineering Optimization]
* [https://www.tandfonline.com/toc/cjen20/current Journal of Engineering Design]
* [https://www.journals.elsevier.com/computer-aided-design/ Computer-Aided Design]
* [https://www.springer.com/mathematics/journal/10957 Journal of Optimization Theory and Applications]
* [[Structural and Multidisciplinary Optimization]]
* [[Journal of Product Innovation Management]]
* [[International Journal of Research in Marketing]]
== See also ==
* [https://wiki.ece.cmu.edu/ddl/index.php/Main_Page Design Decisions Wiki (DDWiki)] : Established by the Design Decisions Laboratory at Carnegie Mellon University in 2006 as a central resource for sharing information and tools to analyze and support decision-making
▲== References ==
▲<references />
== Further reading ==
* Rutherford., Aris, ([2016], ©1961). ''The optimal design of chemical reactors : a study in dynamic programming''. Saint Louis: Academic Press/Elsevier Science.
* Jerome., Bracken, ([1968]). ''Selected applications of nonlinear programming''. McCormick, Garth P.,. New York,: Wiley.
* L., Fox, Richard ([1971]). ''Optimization methods for engineering design''. Reading, Mass.,: Addison-Wesley Pub. Co.
* Johnson, Ray C. Mechanical Design Synthesis With Optimization Applications. New York: Van Nostrand Reinhold Co, 1971.
* 1905-, Zener, Clarence, ([1971]). ''Engineering design by geometric programming''. New York,: Wiley-Interscience.
* H., Mickle, Marlin ([1972]). ''Optimization in systems engineering''. Sze, T. W., 1921-2017,. Scranton,: Intext Educational Publishers.
* Optimization and design; [papers]. Avriel, M.,, Rijckaert, M. J.,, Wilde, Douglass J.,, NATO Science Committee., Katholieke Universiteit te Leuven (1970- ). Englewood Cliffs, N.J.,: Prentice-Hall. [1973].
* J., Wilde, Douglass (1978). ''Globally optimal design''. New York: Wiley.
* J., Haug, Edward (1979). ''Applied optimal design : mechanical and structural systems''. Arora, Jasbir S.,. New York: Wiley.
* Uri., Kirsch, (1981). ''Optimum structural design : concepts, methods, and applications''. New York: McGraw-Hill.
* Uri., Kirsch, (1993). ''Structural optimization : fundamentals and applications''. Berlin: Springer-Verlag.
* ''Structural optimization : recent developments and applications''. Lev, Ovadia E., American Society of Civil Engineers. Structural Division., American Society of Civil Engineers. Structural Division. Committee on Electronic Computation. Committee on Optimization. New York, N.Y.: ASCE. 1981.
* ''Foundations of structural optimization : a unified approach''. Morris, A. J. Chichester [West Sussex]: Wiley. 1982.
* N., Siddall, James (1982). ''Optimal engineering design : principles and applications''. New York: M. Dekker.
* 1944-, Ravindran, A., (2006). ''Engineering optimization : methods and applications''. Reklaitis, G. V., 1942-, Ragsdell, K. M. (2nd ed.). Hoboken, N.J.: John Wiley & Sons. {{ISBN|0471558141}}. [[OCLC]] 61463772.
* N.,, Vanderplaats, Garret (1984). ''Numerical optimization techniques for engineering design : with applications''. New York: McGraw-Hill. {{ISBN|0070669643}}. [[OCLC]] 9785595.
* T., Haftka, Raphael (1990). ''Elements of Structural Optimization''. Gürdal, Zafer., Kamat, Manohar P. (Second rev. edition ed.). Dordrecht: Springer Netherlands. {{ISBN|9789401578622}}. [[OCLC]] 851381183.
* S., Arora, Jasbir (2011). ''Introduction to optimum design'' (3rd ed.). Boston, MA: Academic Press. {{ISBN|9780123813756}}. [[OCLC]] 760173076.
* S.,, Janna, William. ''Design of fluid thermal systems'' (SI edition ; fourth edition ed.). Stamford, Connecticut. {{ISBN|9781285859651}}. [[OCLC]] 881509017.
* ''Structural optimization : status and promise''. Kamat, Manohar P. Washington, DC: American Institute of Aeronautics and Astronautics. 1993. {{ISBN|156347056X}}. [[OCLC]] 27918651.
* ''Mathematical programming for industrial engineers''. Avriel, M., Golany, B. New York: Marcel Dekker. 1996. {{ISBN|0824796209}}. [[OCLC]] 34474279.
* Hans., Eschenauer, (1997). ''Applied structural mechanics : fundamentals of elasticity, load-bearing structures, structural optimization : including exercises''. Olhoff, Niels., Schnell, W. Berlin: Springer. {{ISBN|3540612327}}. [[OCLC]] 35184040.
* 1956-, Belegundu, Ashok D., (2011). ''Optimization concepts and applications in engineering''. Chandrupatla, Tirupathi R., 1944- (2nd ed.). New York: Cambridge University Press. {{ISBN|9781139037808}}. [[OCLC]] 746750296.
* Okechi., Onwubiko, Chinyere (2000). ''Introduction to engineering design optimization''. Upper Saddle River, NJ: Prentice-Hall. {{ISBN|0201476738}}. [[OCLC]] 41368373.
* ''Optimization in action : proceedings of the Conference on Optimization in Action held at the University of Bristol in January 1975''. Dixon, L. C. W. (Laurence Charles Ward), 1935-, Institute of Mathematics and Its Applications. London: Academic Press. 1976. {{ISBN|0122185501}}. [[OCLC]] 2715969.
* P., Williams, H. (2013). ''Model building in mathematical programming'' (5th ed.). Chichester, West Sussex: Wiley. {{ISBN|9781118506189}}. [[OCLC]] 810039791.
* ''Integrated design of multiscale, multifunctional materials and products''. McDowell, David L., 1956-. Oxford: Butterworth-Heinemann. 2010. {{ISBN|9781856176620}}. [[OCLC]] 610001448.
* M.,, Dede, Ercan. ''Multiphysics simulation : electromechanical system applications and optimization''. Lee, Jaewook,, Nomura, Tsuyoshi,. London. {{ISBN|9781447156406}}. [[OCLC]] 881071474.
* 1962-, Liu, G. P. (Guo Ping), (2001). ''Multiobjective optimisation and control''. Yang, Jian-Bo, 1961-, Whidborne, J. F. (James Ferris), 1960-. Baldock, Hertfordshire: Research Studies Press. {{ISBN|0585491941}}. [[OCLC]] 54380075.
=== Structural Topology Optimization ===
{{refbegin}}
*{{cite journal |title=Generating optimal topologies in structural design using a homogenization method |journal=Computer Methods in Applied Mechanics and Engineering |volume=71 |issue=2 |pages=197–224 |date=1988-11-01 |doi=10.1016/0045-7825(88)90086-2 |issn=0045-7825 |url= | last1 = Bendsøe | first1 = Martin Philip | last2 = Kikuchi | first2 = Noboru|hdl=2027.42/27079 |hdl-access=free }}
*{{cite book |first=Martin P. |last=Bendsøe |title=Optimization of structural topology, shape, and material |publisher=Springer |date=1995 |isbn=3540590579 }}
*{{cite book |first=Hassani |last=Behrooz |title=Homogenization and Structural Topology Optimization : Theory, Practice and Software |publisher=Springer |date=1999 |isbn=9781447108917 |oclc=853262659 }}
*{{cite book |last1=Bendsøe |first1=Martin P. |last2=Sigmund |first2=O. |title=Topology optimization : theory, methods, and applications |publisher=Springer |edition=2nd |date=2013 |isbn=9783662050866 |oclc=50448149 |url=https://books.google.com/books?id=ZCjsCAAAQBAJ&pg=PR1}}
*{{cite book |editor-last=Rozvany |editor-first=G.I.N. |editor-last2=Lewiński |editor-first2=T. |title=Topology optimization in structural and continuum mechanics |publisher=Springer |date=2014 |isbn=9783709116432 |oclc=859524179 |url=https://books.google.com/books?id=B8HHBAAAQBAJ&pg=PP1}}
{{refend}}
{{Design}}
[[Category:Design]]
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