| Authors |
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| Publication date |
2010
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| Journal |
Theoretical and Mathematical Physics
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| Volume | Issue number |
165 | 3
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| Pages (from-to) |
1637-1649
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| Organisations |
-
Faculty of Science (FNWI) - Korteweg-de Vries Institute for Mathematics (KdVI)
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| Abstract |
Let E 0 be a holomorphic vector bundle over P1(C) and †0 be a meromorphic connection of E 0. We introduce the notion of an integrable connection that describes the movement of the poles of †0 in the complex plane with integrability preserved. We show the that such a deformation exists under sufficiently weak conditions on the deformation space. We also show that if the vector bundle E0 is trivial, then the solutions of the corresponding nonlinear equations extend meromorphically to the deformation space.
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| Document type |
Article
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| Note |
Also publ. in Russian: Helminck, G.F. & Poberezhny, V.A. (2010). Подвижные полюсы мероморфных линейных систем на P1(C) в комплексной плоскости. --- Теоретическая и математическая физика, 165 --- (3), 472-487.
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| Language |
English
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| Published at |
https://doi.org/10.1007/s11232-010-0134-z
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