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  • 1
    Book
    Book
    Equivariant degree theory / (2003)
    Berlin [u.a.] :de Gruyter,
    Details
    UID:
    almahu_BV017062014
    Format: XIX, 361 S.
    ISBN: 3-11-017550-9
    Series Statement: De Gruyter series in nonlinear analysis and applications 8
    Note: Literaturverz. S. 337 - 358
    Language: English
    Subjects: Mathematics
    RVK:
    SK 600
    RVK:
    SK 350
    Keywords: Globale Analysis ; Äquivariante Abbildung ; Abbildungsgrad
    URL: Inhaltstext
    URL: http://www.loc.gov/catdir/toc/fy0608/2003043999.html
    Author information: Vignoli, Alfonso, 1940-
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  • 2
    Online Resource
    Online Resource
    Equivariant degree theory (2003)
    Berlin [u.a.] : de Gruyter
    Details
    UID:
    almahu_9947359873202882
    Format: Online-Ressource (PDF-Datei, 380 p.)
    Edition: Online-Ausg. 2009 Electronic reproduction; Available via World Wide Web
    ISBN: 3110175509 , 9783110200027
    Series Statement: De Gruyter series in nonlinear analysis and applications 8
    Content: This book presents a new degree theory for maps which commute with a group of symmetries. This degree is no longer a single integer but an element of the group of equivariant homotopy classes of maps between two spheres and depends on the orbit types of the spaces. The authors develop completely the theory and applications of this degree in a self-contained presentation starting with only elementary facts. The first chapter explains the basic tools of representation theory, homotopy theory and differential equations needed in the text. Then the degree is defined and its main abstract propertie
    Note: Includes bibliographical references (p. [337]-358) and index , Chapter 3 Equivariant Homotopy Groups of Spheres3.1 The extension problem; 3.2 Homotopy groups of G-maps; 3.3 Computation of G-classes; 3.4 Borsuk-Ulam results; 3.5 The one parameter case; 3.6 Orthogonal maps; 3.7 Operations; 3.8 Bibliographical remarks; Chapter 4 Equivariant Degree and Applications; 4.1 Range of the equivariant degree; 4.2 G-degree of an isolated orbit; 4.3 G-Index for an orthogonal map; 4.4 G-Index of a loop of stationary points; 4.5 Bibliographical remarks; Appendix A Equivariant Matrices; Appendix B Periodic Solutions of Linear Systems; Bibliography; Index;. , Preface; Contents; Introduction; Chapter 1 Preliminaries; 1.1 Group actions; 1.2 The fundamental cell lemma; 1.3 Equivariant maps; 1.4 Averaging; 1.5 Irreducible representations; 1.6 Extensions of G-maps; 1.7 Orthogonal maps; 1.8 Equivariant homotopy groups of spheres; 1.9 Symmetries and differential equations; 1.10 Bibliographical remarks; Chapter 2 Equivariant Degree; 2.1 Equivariant degree in finite dimension; 2.2 Properties of the equivariant degree; 2.3 Approximation of the G-degree; 2.4 Orthogonal maps; 2.5 Applications; 2.6 Operations; 2.7 Bibliographical remarks.
    Language: English
    Subjects: Mathematics
    RVK:
    SK 300
    Keywords: Globale Analysis ; Äquivariante Abbildung ; Abbildungsgrad
    DOI: 10.1515/9783110200027
    URL: http://www.degruyter.com/doi/book/10.1515/9783110200027
    URL: Cover
    URL: Volltext  (URL des Erstveröffentlichers)
    URL: Volltext  (URL des Erstveröffentlichers)
    URL: Volltext  (lizenzpflichtig)
    URL: lizenzpflichtig
    URL: Cover
    URL: Inhaltstext
    URL: Cover
    URL: Volltext  (URL des Erstveröffentlichers)
    Library Location Call Number Volume/Issue/Year Availability
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    Online Resource
    Online Access
    Open Access Request
    HU Berlin
    FU Berlin
    UB Potsdam
    TU Berlin
  • 3
    Online Resource
    Online Resource
    Equivariant Degree Theory / (2008)
    Berlin ;Boston :De Gruyter,
    Details
    UID:
    almafu_9958353592702883
    Format: 1 online resource (380p.)
    Edition: Reprint 2012
    ISBN: 9783110200027
    Series Statement: De Gruyter Series in Nonlinear Analysis and Applications ; 8
    Content: This book presents a new degree theory for maps which commute with a group of symmetries. This degree is no longer a single integer but an element of the group of equivariant homotopy classes of maps between two spheres and depends on the orbit types of the spaces. The authors develop completely the theory and applications of this degree in a self-contained presentation starting with only elementary facts. The first chapter explains the basic tools of representation theory, homotopy theory and differential equations needed in the text. Then the degree is defined and its main abstract properties are derived. The next part is devoted to the study of equivariant homotopy groups of spheres and to the classification of equivariant maps in the case of abelian actions. These groups are explicitely computed and the effects of symmetry breaking, products and composition are thorougly studied. The last part deals with computations of the equivariant index of an isolated orbit and of an isolated loop of stationary points. Here differential equations in a variety of situations are considered: symmetry breaking, forcing, period doubling, twisted orbits, first integrals, gradients etc. Periodic solutions of Hamiltonian systems, in particular spring-pendulum systems, are studied as well as Hopf bifurcation for all these situations.
    Note: Frontmatter -- , Preface -- , Contents -- , Introduction -- , Chapter 1. Preliminaries -- , Chapter 2. Equivariant Degree -- , Chapter 3. Equivariant Homotopy Groups of Spheres -- , Chapter 4. Equivariant Degree and Applications -- , Appendix A. Equivariant Matrices -- , Appendix Β. Periodic Solutions of Linear Systems -- , Bibliography -- , Index , In English.
    Additional Edition: ISBN 978-3-11-017550-9
    Language: English
    Subjects: Mathematics
    RVK:
    SK 300
    DOI: 10.1515/9783110200027
    URL: https://doi.org/10.1515/9783110200027
    URL: https://doi.org/10.1515/9783110200027
    URL: https://www.degruyter.com/isbn/9783110200027
    URL: Cover
    Library Location Call Number Volume/Issue/Year Availability
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    Online Resource
    Open Access Request
    HU Berlin
    FU Berlin
  • 4
    Online Resource
    Online Resource
    Equivariant Degree Theory / (2008)
    Berlin ;Boston :De Gruyter,
    Details
    UID:
    edocfu_9958353592702883
    Format: 1 online resource (380p.)
    Edition: Reprint 2012
    ISBN: 9783110200027
    Series Statement: De Gruyter Series in Nonlinear Analysis and Applications ; 8
    Content: This book presents a new degree theory for maps which commute with a group of symmetries. This degree is no longer a single integer but an element of the group of equivariant homotopy classes of maps between two spheres and depends on the orbit types of the spaces. The authors develop completely the theory and applications of this degree in a self-contained presentation starting with only elementary facts. The first chapter explains the basic tools of representation theory, homotopy theory and differential equations needed in the text. Then the degree is defined and its main abstract properties are derived. The next part is devoted to the study of equivariant homotopy groups of spheres and to the classification of equivariant maps in the case of abelian actions. These groups are explicitely computed and the effects of symmetry breaking, products and composition are thorougly studied. The last part deals with computations of the equivariant index of an isolated orbit and of an isolated loop of stationary points. Here differential equations in a variety of situations are considered: symmetry breaking, forcing, period doubling, twisted orbits, first integrals, gradients etc. Periodic solutions of Hamiltonian systems, in particular spring-pendulum systems, are studied as well as Hopf bifurcation for all these situations.
    Note: Frontmatter -- , Preface -- , Contents -- , Introduction -- , Chapter 1. Preliminaries -- , Chapter 2. Equivariant Degree -- , Chapter 3. Equivariant Homotopy Groups of Spheres -- , Chapter 4. Equivariant Degree and Applications -- , Appendix A. Equivariant Matrices -- , Appendix Β. Periodic Solutions of Linear Systems -- , Bibliography -- , Index , In English.
    Additional Edition: ISBN 978-3-11-017550-9
    Language: English
    DOI: 10.1515/9783110200027
    URL: https://doi.org/10.1515/9783110200027
    Library Location Call Number Volume/Issue/Year Availability
    BibTip Others were also interested in ...
    Online Resource
    Open Access Request
    FU Berlin
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