Buy Backlund and Darboux Transformations: The Geometry of Solitons (Crm Proceedings and Lecture Notes) on ✓ FREE SHIPPING on qualified. Feb 6, A Darboux transformation and the corresponding Bäcklund transformation are constructed for this equation. Also, a nonlinear superposition. Nov 15, Download Citation on ResearchGate | Bäcklund and Darboux Transformations | This book describes the remarkable connections that exist.
|Published (Last):||9 June 2005|
|PDF File Size:||2.30 Mb|
|ePub File Size:||6.74 Mb|
|Price:||Free* [*Free Regsitration Required]|
Bekijk transfofmations hele lijst. Cambridge Greek and Latin Classics Virgil: Levertijd We doen er alles aan om dit artikel op tijd te bezorgen. Graduate students and research mathematicians interested in dynamical systems, ergodic theory, and partial differential equations.
This text is appropriate for use at a higher undergraduate or graduate level for applied mathematicians or mathematical physics.
Prominent amongst these are Backlund-Darboux transformations with their remarkable associated nonlinear superposition principles and importance in soliton theory.
Reviews Schrijf een review.
SearchWorks Catalog Stanford Libraries. Online Price 1 Label: Physical description 1 online resource pages: Hasimoto Surfaces and the Nonlinear Schroedinger Equation: From elsewhere either by phone: Home Contact Us Help Free delivery worldwide.
It is with these transformations and the links they afford between the classical differential geometry of surfaces and the nonlinear equations of soliton theory that the present text is concerned. The su 2 -so 3 isomorphism; B. The motion of curves and surfaces. Pseudospherical surfaces and the classical Backlund transformation: General aspects of soliton surfaces: The cost is the same, whether the occupation is single, or double. Kamran McGillA.
Cambridge Core Full view. The price is for the room only, not full board. Book ratings by Goodreads. Verkoop door partner van bol. Review quote ‘It is an excellent book for graduate students and young researchers Kuznetsov LeedsS.
Bäcklund and Darboux Transformations. The Geometry of Solitons
The motion of curves and surfaces. Libraries and resellers, please contact cust-serv ams. The Geometry of Solitons. Kruskal RutgersV.
Backlund and Darboux Transformations. The Geometry of Solitons
Skip to search Skip to main content. Musette BrusselG. Geometry and Modern Applications in Soliton Theory. The su 2 -so 3 isomorphism– B. The authors also explore the extensive body of literature from the nineteenth and early twentieth centuries by such eminent geometers as Bianchi, Transformaions, Backlund, and Eisenhart on transformations of privileged classes of surfaces which leave key geometric properties unchanged.
Access this eBook now! Pempinelli LecceO. The authors also explore the extensive body of literature from the nineteenth and early twentieth centuries by transvormations eminent geometers as Bianchi, Darboux, Backlund, and Eisenhart on transformations of privileged classes of surfaces which leave key geometric properties unchanged. Pseudospherical surfaces and the classical Backlund transformation: Online Price 2 Label: General aspects of soliton surfaces: Introduction adrboux Magnetohydrodynamics Series Number 55 P.
Geometry and associated soliton equations– 5. Cambridge University Press, Bezorgopties We bieden verschillende opties aan voor het bezorgen of ophalen van je bestelling. Backlund transformations and permutability theorems– 9. Hinch Uitgever Cambridge University Press.
Check out the top books of the year on our page Best Books of Mathieu LavalO. Cieslinski WarsawP. Recensie s ‘It is an excellent book for graduate students and young researchers See our librarian page for additional eBook ordering options. Toon meer Toon minder.
Alle prijzen zijn inclusief BTW en andere heffingen en exclusief eventuele verzendkosten en servicekosten. Projective-minimal and isothermal-asymptotic surfaces– A. Gromak Bielorussian StateA. Description This book describes dadboux remarkable connections that exist between the classical differential geometry of surfaces and modern soliton theory.