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Line 2: {{About\|\|the linearization of a partial order\|Linear extension\|the linearization in concurrent computing\|Linearizability}} In [[mathematics]], '''linearization''' ([[British English]]: '''linearisation''') is finding the [[linear approximation]] to a [[function (mathematics)\|function]] at a given point. The linear approximation of a function is the first order [[Taylor expansion]] around the point of interest. In the study of [[dynamical system]]s, linearization is a method for assessing the local [[stability theory\|stability]] of an [[equilibrium point]] of a [[system]] of [[nonlinear]] [[differential equation]]s or discrete [[dynamical system]]s.<ref>[http://www.scholarpedia.org/article/Siegel_disks/Linearization The linearization problem in complex dimension one dynamical systems at Scholarpedia]</ref> This method is used in fields such as [[engineering]], [[physics]], [[economics]], and [[ecology]]. ==Linearization of a function== Line 53: ===Stability analysis=== In [[stability theory\|stability]] analysis of [[Autonomous system (mathematics)\|autonomous systems]], one can use the [[eigenvalue]]s of the [[Jacobian matrix and determinant\|Jacobian matrix]] evaluated at a [[hyperbolic equilibrium point]] to determine the nature of that equilibrium. This is the content of the [[linearization theorem]]. For time-varying systems, the linearization requires additional justification.<ref>{{cite journal \|first=G. A. \|last=Leonov \|first2=N. V. \|last2=Kuznetsov \|title=Time-Varying Linearization and the Perron effects \|journal=[[International Journal of Bifurcation and Chaos]] \|volume=17 \|issue=4 \|year=2007 \|pages=1079–1107 \|doi=10.1142/S0218127407017732 \|bibcode=2007IJBC...17.1079L }}</ref> ===Microeconomics=== In [[microeconomics]], [[decision rule]]s may be approximated under the state-space approach to linearization.<ref name="statespace">Moffatt, Mike. (2008) [[About.com]] ''[http://economics.about.com/od/economicsglossary/g/statespace.htm State-Space Approach] {{Webarchive\|url=https://web.archive.org/web/20160304055023/http://economics.about.com/od/economicsglossary/g/statespace.htm \|date=2016-03-04 }}'' Economics Glossary; Terms Beginning with S. Accessed June 19, 2008.</ref> Under this approach, the [[Euler equations (fluid dynamics)#Conservation form\|Euler equations]] of the [[utility maximization problem]] are linearized around the stationary steady state.<ref name="statespace"/> A unique solution to the resulting system of dynamic equations then is found.<ref name="statespace"/> ===Optimization=== Line 71: * [[Taylor approximation]] * [[Functional equation (L-function)]] * [[Quasilinearization]] ==References==