Produktbild: Differential Galois Theory and Non-Integrability of Hamiltonian Systems
Band 179

Differential Galois Theory and Non-Integrability of Hamiltonian Systems

Aus der Reihe Progress in Mathematics

Fr. 62.90

inkl. gesetzl. MwSt., Versandkostenfrei


Beschreibung

Produktdetails

Einband

Taschenbuch

Erscheinungsdatum

26.10.2012

Abbildungen

5 schwarz-weiße Abbildungen, Bibliographie

Verlag

Springer Basel

Seitenzahl

167

Maße (L/B/H)

23.5/15.5/1 cm

Gewicht

290 g

Auflage

1999

Sprache

Englisch

ISBN

978-3-0348-9741-9

Beschreibung

Rezension

"...[an] account of recent work of the author and co-workers on obstructions to the complete integrability of complex Hamiltonian systems. The methods are of considerable importance to practitioners... The book provides all the needed background...and presents concrete examples in considerable detail... The final chapter...includes a fascinating account of work-in-progress by the author and his collaborators... Of particular interest...is the program of extending the differential Galois theory to higher-order variational equations... [an] excellent introduction to non-integrability methods in Hamiltonian mechanics [that] brings the reader to the forefront of research in the area. The inclusion of a large number of worked-out examples, many of wide applied interest, is commendable. There are many historical references, and an extensive bibliography."


--Mathematical Reviews

Produktdetails

Einband

Taschenbuch

Erscheinungsdatum

26.10.2012

Abbildungen

5 schwarz-weiße Abbildungen, Bibliographie

Verlag

Springer Basel

Seitenzahl

167

Maße (L/B/H)

23.5/15.5/1 cm

Gewicht

290 g

Auflage

1999

Sprache

Englisch

ISBN

978-3-0348-9741-9

Herstelleradresse

Springer Basel AG
Picassoplatz 4
4010 Basel
Schweiz
Fax: +41 61 2050799

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  • Produktbild: Differential Galois Theory and Non-Integrability of Hamiltonian Systems
  • 1 Introduction.- 2 Differential Galois Theory.- 2.1 Algebraic groups.- 2.2 Classical approach.- 2.3 Meromorphic connections.- 2.4 The Tannakian approach.- 2.5 Stokes multipliers.- 2.6 Coverings and differential Galois groups.- 2.7 Kovacic’s algorithm.- 2.8 Examples.- 2.8.1 The hypergeometric equation.- 2.8.2 The Bessel equation.- 2.8.3 The confluent hypergeometric equation.- 2.8.4 The Lamé equation.- 3 Hamiltonian Systems.- 3.1 Definitions.- 3.2 Complete integrability.- 3.3 Three non-integrability theorems.- 3.4 Some properties of Poisson algebras.- 4 Non-integrability Theorems.- 4.1 Variational equations.- 4.1.1 Singular curves.- 4.1.2 Meromorphic connection associated with the variational equation.- 4.1.3 Reduction to normal variational equations.- 4.1.4 Reduction from the Tannakian point of view.- 4.2 Main results.- 4.3 Examples.- 5 Three Models.- 5.1 Homogeneous potentials.- 5.1.1 The model.- 5.1.2 Non-integrability theorem.- 5.1.3 Examples.- 5.2 The Bianchi IX cosmological model.- 5.2.1 The model.- 5.2.2 Non-integrability.- 5.3 Sitnikov’s Three-Body Problem.- 5.3.1 The model.- 5.3.2 Non-integrability.- 6 An Application of the Lamé Equation.- 6.1 Computation of the potentials.- 6.2 Non-integrability criterion.- 6.3 Examples.- 6.4 The homogeneous Hénon-Heiles potential.- 7 A Connection with Chaotic Dynamics.- 7.1 Grotta-Ragazzo interpretation of Lerman’s theorem.- 7.2 Differential Galois approach.- 7.3 Example.- 8 Complementary Results and Conjectures.- 8.1 Two additional applications.- 8.2 A conjecture about the dynamic.- 8.3 Higher-order variational equations.- 8.3.1 A conjecture.- 8.3.2 An application.- A Meromorphic Bundles.- B Galois Groups and Finite Coverings.- C Connections with Structure Group.