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Projective structure and integrable geodesic flows on the extension of Bott-Virasoro group
This is a sequel to my paper IHES/M/00/23, triggered from a question posed by Marcel-Ovsienko-Roger in their paper (Lett. Math. Phys. 40 (1997) 31-39). In this paper we show that the multicomponent (or vector) Ito equation, modified dispersive water wave equation and modified dispersionless long wav...
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| Lenguaje: | eng |
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2000
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| Acceso en línea: | http://cds.cern.ch/record/456554 |
| _version_ | 1780896271464136704 |
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| author | Guha, P |
| author_facet | Guha, P |
| author_sort | Guha, P |
| collection | CERN |
| description | This is a sequel to my paper IHES/M/00/23, triggered from a question posed by Marcel-Ovsienko-Roger in their paper (Lett. Math. Phys. 40 (1997) 31-39). In this paper we show that the multicomponent (or vector) Ito equation, modified dispersive water wave equation and modified dispersionless long wave equation are the geodesic flows with respect to an $L^2$ metric on the semidirect product space ${\widehat {Diff^s(S^1) \bo {C^{\infty}(S^1)}^k}}$, where $Diff^s(S^1)$ is the group of orientation preserving Sobolev $H^s$ diffeomorphisms of the circle. We also study the projective structure associated with the matrix Strum-Liouville operators on the circle. |
| id | cern-456554 |
| institution | Organización Europea para la Investigación Nuclear |
| language | eng |
| publishDate | 2000 |
| record_format | invenio |
| spelling | cern-4565542019-09-30T06:29:59Zhttp://cds.cern.ch/record/456554engGuha, PProjective structure and integrable geodesic flows on the extension of Bott-Virasoro groupMathematical Physics and MathematicsThis is a sequel to my paper IHES/M/00/23, triggered from a question posed by Marcel-Ovsienko-Roger in their paper (Lett. Math. Phys. 40 (1997) 31-39). In this paper we show that the multicomponent (or vector) Ito equation, modified dispersive water wave equation and modified dispersionless long wave equation are the geodesic flows with respect to an $L^2$ metric on the semidirect product space ${\widehat {Diff^s(S^1) \bo {C^{\infty}(S^1)}^k}}$, where $Diff^s(S^1)$ is the group of orientation preserving Sobolev $H^s$ diffeomorphisms of the circle. We also study the projective structure associated with the matrix Strum-Liouville operators on the circle.IHES-M-2000-38oai:cds.cern.ch:4565542000 |
| spellingShingle | Mathematical Physics and Mathematics Guha, P Projective structure and integrable geodesic flows on the extension of Bott-Virasoro group |
| title | Projective structure and integrable geodesic flows on the extension of Bott-Virasoro group |
| title_full | Projective structure and integrable geodesic flows on the extension of Bott-Virasoro group |
| title_fullStr | Projective structure and integrable geodesic flows on the extension of Bott-Virasoro group |
| title_full_unstemmed | Projective structure and integrable geodesic flows on the extension of Bott-Virasoro group |
| title_short | Projective structure and integrable geodesic flows on the extension of Bott-Virasoro group |
| title_sort | projective structure and integrable geodesic flows on the extension of bott-virasoro group |
| topic | Mathematical Physics and Mathematics |
| url | http://cds.cern.ch/record/456554 |
| work_keys_str_mv | AT guhap projectivestructureandintegrablegeodesicflowsontheextensionofbottvirasorogroup |