Publication: The group of symplectomorphisms of R2nand the Euler equations
| dc.contributor.department | Department of Mathematics | |
| dc.contributor.kuauthor | İnci, Hasan | |
| dc.contributor.schoolcollegeinstitute | College of Sciences | |
| dc.date.accessioned | 2026-07-02T07:04:40Z | |
| dc.date.available | 2026-03-27 | |
| dc.date.issued | 2026 | |
| dc.description.abstract | In this paper we consider the “symplectic” version of the Euler equations studied by Ebin[7]. We show that these equations are globally well-posed on the Sobolev space Hs(R2n) for n≥1 and s>2n/2+1[jls-end-space/]. The mechanism underlying global well-posedness has similarities to the case of the 2D Euler equations. Moreover we consider the group of symplectomorphisms Dωs(R2n) of Sobolev type Hs preserving the symplectic form ω=dx1∧dx2+…+dx2n−1∧dx2n[jls-end-space/]. We show that Dωs(R2n) is a closed analytic submanifold of the full group Ds(R2n) of diffeomorphisms of Sobolev type Hs preserving the orientation. We prove that the symplectic version of the Euler equations has a Lagrangian formulation on Dωs(R2n) as an analytic second order ODE in the manner of the Euler-Arnold formalism[1]. In contrast to this “smooth” behavior in Lagrangian coordinates we show that it has a very “rough” behavior in Eulerian coordinates. To be precise we show that the time T>0 solution map u0↦u(T) mapping the initial value of the solution to its time T value is nowhere locally uniformly continuous. In particular the solution map is nowhere locally Lipschitz. © 2025 Elsevier B.V. All rights are reserved, including those for text and data mining, AI training, and similar technologies. | |
| dc.description.fulltext | No | |
| dc.description.harvestedfrom | Manual | |
| dc.description.indexedby | WoS | |
| dc.description.indexedby | Scopus | |
| dc.description.openaccess | All Open Access, Hybrid Gold | |
| dc.description.publisherscope | International | |
| dc.description.readpublish | N/A | |
| dc.description.sponsoredbyTubitakEu | N/A | |
| dc.description.version | Published version | |
| dc.identifier.WoSQuartile | Q2 | |
| dc.identifier.doi | 10.1016/j.difgeo.2025.102320 | |
| dc.identifier.eissn | 1872-6984 | |
| dc.identifier.embargo | No | |
| dc.identifier.issn | 0926-2245 | |
| dc.identifier.scopus | 2-s2.0-105029762969 | |
| dc.identifier.uri | https://doi.org/10.1016/j.difgeo.2025.102320 | |
| dc.identifier.uri | https://hdl.handle.net/20.500.14288/32916 | |
| dc.identifier.volume | 102 | |
| dc.identifier.wos | 001638830900001 | |
| dc.keywords | Euler equations | |
| dc.keywords | Global well-posedness | |
| dc.keywords | Groups of symplectomorphisms | |
| dc.language | eng | |
| dc.publisher | Elsevier | |
| dc.relation.affiliation | Koç University | |
| dc.relation.collection | Koç University Institutional Repository | |
| dc.relation.ispartof | Differential Geometry and its Application | |
| dc.relation.openaccess | N/A | |
| dc.rights | N/A | |
| dc.rights.uri | N/A | |
| dc.subject | Mathematics | |
| dc.title | The group of symplectomorphisms of R2nand the Euler equations | |
| dc.type | Journal Article | |
| dspace.entity.type | Publication | |
| relation.isOrgUnitOfPublication | 2159b841-6c2d-4f54-b1d4-b6ba86edfdbe | |
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