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Difference equations in normed spaces: stability and oscillations

Difference equations appear as natural descriptions of observed evolution phenomena because most measurements of time evolving variables are discrete. They also appear in the applications of discretization methods for differential, integral and integro-differential equations. The application of t...

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Autor principal: Gil, Michael
Lenguaje:eng
Publicado: Elsevier 2007
Materias:
Acceso en línea:http://cds.cern.ch/record/1991597
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author Gil, Michael
author_facet Gil, Michael
author_sort Gil, Michael
collection CERN
description Difference equations appear as natural descriptions of observed evolution phenomena because most measurements of time evolving variables are discrete. They also appear in the applications of discretization methods for differential, integral and integro-differential equations. The application of the theory of difference equations is rapidly increasing to various fields, such as numerical analysis, control theory, finite mathematics, and computer sciences. This book is devoted to linear and nonlinear difference equations in a normed space. The main methodology presented in this book is based on a combined use of recent norm estimates for operator-valued functions with the following methods and results: The freezing methodThe Liapunov type equationThe method of majorantsThe multiplicative representation of solutionsDeals systematically with difference equations in normed spaces Considers new classes of equations that could not be studied in the frameworks of ordinary and partial difference equationsDevelops the freezing method and presents recent results on Volterra discrete equationsContains an approach based on the estimates for norms of operator functions
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spelling cern-19915972021-04-21T20:28:13Zhttp://cds.cern.ch/record/1991597engGil, MichaelDifference equations in normed spaces: stability and oscillationsMathematical Physics and MathematicsDifference equations appear as natural descriptions of observed evolution phenomena because most measurements of time evolving variables are discrete. They also appear in the applications of discretization methods for differential, integral and integro-differential equations. The application of the theory of difference equations is rapidly increasing to various fields, such as numerical analysis, control theory, finite mathematics, and computer sciences. This book is devoted to linear and nonlinear difference equations in a normed space. The main methodology presented in this book is based on a combined use of recent norm estimates for operator-valued functions with the following methods and results: The freezing methodThe Liapunov type equationThe method of majorantsThe multiplicative representation of solutionsDeals systematically with difference equations in normed spaces Considers new classes of equations that could not be studied in the frameworks of ordinary and partial difference equationsDevelops the freezing method and presents recent results on Volterra discrete equationsContains an approach based on the estimates for norms of operator functionsElsevieroai:cds.cern.ch:19915972007
spellingShingle Mathematical Physics and Mathematics
Gil, Michael
Difference equations in normed spaces: stability and oscillations
title Difference equations in normed spaces: stability and oscillations
title_full Difference equations in normed spaces: stability and oscillations
title_fullStr Difference equations in normed spaces: stability and oscillations
title_full_unstemmed Difference equations in normed spaces: stability and oscillations
title_short Difference equations in normed spaces: stability and oscillations
title_sort difference equations in normed spaces: stability and oscillations
topic Mathematical Physics and Mathematics
url http://cds.cern.ch/record/1991597
work_keys_str_mv AT gilmichael differenceequationsinnormedspacesstabilityandoscillations