Normal Forms and Unfoldings for Local Dynamical Systems [electronic resource] /

Normal Forms and Unfoldings for Local Dynamical Systems [electronic resource] /

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The subject of local dynamical systems is concerned with the following two questions: 1. Given an n×n matrix A, describe the behavior, in a neighborhood of the origin, of the solutions of all systems of di?erential equations having a rest point at the origin with linear part Ax, that is, all systems of the form x ? = Ax+··· , n where x? R and the dots denote terms of quadratic and higher order. 2. Describethebehavior(neartheorigin)ofallsystemsclosetoasystem of the type just described. To answer these questions, the following steps are employed: 1. A normal form is obtained for the general system with linear part Ax. The normal form is intended to be the simplest form into which any system of the intended type can be transformed by changing the coordinates in a prescribed manner. 2. An unfolding of the normal form is obtained. This is intended to be the simplest form into which all systems close to the original s- tem can be transformed. It will contain parameters, called unfolding parameters, that are not present in the normal form found in step 1. vi Preface 3. The normal form, or its unfolding, is truncated at some degree k, and the behavior of the truncated system is studied.

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Main Authors: Murdock, James. author., SpringerLink (Online service)
Format: Texto biblioteca
Language:eng
Published: New York, NY : Springer New York : Imprint: Springer, 2003
Subjects:Mathematics., Differential equations., Applied mathematics., Engineering mathematics., Physics., Ordinary Differential Equations., Applications of Mathematics., Theoretical, Mathematical and Computational Physics.,
Online Access:http://dx.doi.org/10.1007/b97515
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spelling KOHA-OAI-TEST:2051832018-07-30T23:34:09ZNormal Forms and Unfoldings for Local Dynamical Systems [electronic resource] / Murdock, James. author. SpringerLink (Online service) textNew York, NY : Springer New York : Imprint: Springer,2003.engThe subject of local dynamical systems is concerned with the following two questions: 1. Given an n×n matrix A, describe the behavior, in a neighborhood of the origin, of the solutions of all systems of di?erential equations having a rest point at the origin with linear part Ax, that is, all systems of the form x ? = Ax+··· , n where x? R and the dots denote terms of quadratic and higher order. 2. Describethebehavior(neartheorigin)ofallsystemsclosetoasystem of the type just described. To answer these questions, the following steps are employed: 1. A normal form is obtained for the general system with linear part Ax. The normal form is intended to be the simplest form into which any system of the intended type can be transformed by changing the coordinates in a prescribed manner. 2. An unfolding of the normal form is obtained. This is intended to be the simplest form into which all systems close to the original s- tem can be transformed. It will contain parameters, called unfolding parameters, that are not present in the normal form found in step 1. vi Preface 3. The normal form, or its unfolding, is truncated at some degree k, and the behavior of the truncated system is studied.Preface -- 1. Two Examples -- 2. The splitting problem for linear operators -- 3. Linear Normal Forms -- 4. Nonlinear Normal Forms -- 5. Geometrical Structures in Normal Forms -- 6. Selected Topics in Local Bifurcation Theory -- Appendix A: Rings -- Appendix B: Modules -- Appendix C: Format 2b: Generated Recursive (Hori) -- Appendix D: Format 2c: Generated Recursive (Deprit) -- Appendix E: On Some Algorithms in Linear Algebra -- Bibliography -- Index.The subject of local dynamical systems is concerned with the following two questions: 1. Given an n×n matrix A, describe the behavior, in a neighborhood of the origin, of the solutions of all systems of di?erential equations having a rest point at the origin with linear part Ax, that is, all systems of the form x ? = Ax+··· , n where x? R and the dots denote terms of quadratic and higher order. 2. Describethebehavior(neartheorigin)ofallsystemsclosetoasystem of the type just described. To answer these questions, the following steps are employed: 1. A normal form is obtained for the general system with linear part Ax. The normal form is intended to be the simplest form into which any system of the intended type can be transformed by changing the coordinates in a prescribed manner. 2. An unfolding of the normal form is obtained. This is intended to be the simplest form into which all systems close to the original s- tem can be transformed. It will contain parameters, called unfolding parameters, that are not present in the normal form found in step 1. vi Preface 3. The normal form, or its unfolding, is truncated at some degree k, and the behavior of the truncated system is studied.Mathematics.Differential equations.Applied mathematics.Engineering mathematics.Physics.Mathematics.Ordinary Differential Equations.Applications of Mathematics.Theoretical, Mathematical and Computational Physics.Springer eBookshttp://dx.doi.org/10.1007/b97515URN:ISBN:9780387217857
institution COLPOS
collection Koha
country México
countrycode MX
component Bibliográfico
access En linea
En linea
databasecode cat-colpos
tag biblioteca
region America del Norte
libraryname Departamento de documentación y biblioteca de COLPOS
language eng
topic Mathematics.
Differential equations.
Applied mathematics.
Engineering mathematics.
Physics.
Mathematics.
Ordinary Differential Equations.
Applications of Mathematics.
Theoretical, Mathematical and Computational Physics.
Mathematics.
Differential equations.
Applied mathematics.
Engineering mathematics.
Physics.
Mathematics.
Ordinary Differential Equations.
Applications of Mathematics.
Theoretical, Mathematical and Computational Physics.
spellingShingle Mathematics.
Differential equations.
Applied mathematics.
Engineering mathematics.
Physics.
Mathematics.
Ordinary Differential Equations.
Applications of Mathematics.
Theoretical, Mathematical and Computational Physics.
Mathematics.
Differential equations.
Applied mathematics.
Engineering mathematics.
Physics.
Mathematics.
Ordinary Differential Equations.
Applications of Mathematics.
Theoretical, Mathematical and Computational Physics.
Murdock, James. author.
SpringerLink (Online service)
Normal Forms and Unfoldings for Local Dynamical Systems [electronic resource] /
description The subject of local dynamical systems is concerned with the following two questions: 1. Given an n×n matrix A, describe the behavior, in a neighborhood of the origin, of the solutions of all systems of di?erential equations having a rest point at the origin with linear part Ax, that is, all systems of the form x ? = Ax+··· , n where x? R and the dots denote terms of quadratic and higher order. 2. Describethebehavior(neartheorigin)ofallsystemsclosetoasystem of the type just described. To answer these questions, the following steps are employed: 1. A normal form is obtained for the general system with linear part Ax. The normal form is intended to be the simplest form into which any system of the intended type can be transformed by changing the coordinates in a prescribed manner. 2. An unfolding of the normal form is obtained. This is intended to be the simplest form into which all systems close to the original s- tem can be transformed. It will contain parameters, called unfolding parameters, that are not present in the normal form found in step 1. vi Preface 3. The normal form, or its unfolding, is truncated at some degree k, and the behavior of the truncated system is studied.
format Texto
topic_facet Mathematics.
Differential equations.
Applied mathematics.
Engineering mathematics.
Physics.
Mathematics.
Ordinary Differential Equations.
Applications of Mathematics.
Theoretical, Mathematical and Computational Physics.
author Murdock, James. author.
SpringerLink (Online service)
author_facet Murdock, James. author.
SpringerLink (Online service)
author_sort Murdock, James. author.
title Normal Forms and Unfoldings for Local Dynamical Systems [electronic resource] /
title_short Normal Forms and Unfoldings for Local Dynamical Systems [electronic resource] /
title_full Normal Forms and Unfoldings for Local Dynamical Systems [electronic resource] /
title_fullStr Normal Forms and Unfoldings for Local Dynamical Systems [electronic resource] /
title_full_unstemmed Normal Forms and Unfoldings for Local Dynamical Systems [electronic resource] /
title_sort normal forms and unfoldings for local dynamical systems [electronic resource] /
publisher New York, NY : Springer New York : Imprint: Springer,
publishDate 2003
url http://dx.doi.org/10.1007/b97515
work_keys_str_mv AT murdockjamesauthor normalformsandunfoldingsforlocaldynamicalsystemselectronicresource
AT springerlinkonlineservice normalformsandunfoldingsforlocaldynamicalsystemselectronicresource
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