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홈 > 학술정보 >학술행사 > 세미나
한국고등과학원 세미나

Title
Convergence versus integrability in normal form
Speaker
Nguyen Tien Zung   (Universit Toulouse )
Date
2018-04-19 16:00:00
Host
KIAS
Place
1423
Abstract
I'll explain the following theorem: any local real analytic or holomorphic vector field, which is integrable with the help of Darboux-type first integrals (these are functions of the type $prod_i G_i^{c_i}$ where the $c_i$ are complex numbers and the $G_i$ are local analytic functions) and meromorphic commuting vector fields admits a local analytic normalization ? la Poincar?-Birkhoff. The proof of this result is based on a geometric method involving associated torus actions of dynamical systems, geometric approximations, and a holomorphic extension lemma. This talk is based on a series of 3 papers of mine on the subject (Math Research Letters 2002, Annals Math 2005, and preprint 2018).
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