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PROJECTIVE LOOPS GENERATE RATIONAL LOOP GROUPS

Part of: Infinite-dimensional Hamiltonian systems Global differential geometry Lie groups

Published online by Cambridge University Press:  17 August 2020

Gang Wang ,
Oliver Goertsches  and
Erxiao Wang Open the ORCID record for Erxiao Wang [Opens in a new window]
Gang Wang
Affiliation:
School of Computer Science and Technology, Dongguan University of Technology, Dongguan, Guangdong Province, China (2017018@dgut.edu.cn)
Oliver Goertsches
Affiliation:
Fachbereich Mathematik und Informatik der Philipps-Universität Marburg - Hans-Meerwein-Strasse 6, Marburg, Germany (goertsch@mathematik.uni-marburg.de)
Erxiao Wang
Affiliation:
College of Mathematics and Computer Science, Zhejiang Normal University, Jinhua, Zhejiang Province, China Department of Mathematics, Hong Kong University of Science and Technology, Clear Water Bay, Kowloon, Hong Kong (wang.eric@zjnu.edu.cn)
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Abstract

We generalize Uhlenbeck’s generator theorem of ${\mathcal{L}}^{-}\operatorname{U}_{n}$ to the full rational loop group ${\mathcal{L}}^{-}\operatorname{GL}_{n}\mathbb{C}$ and its subgroups ${\mathcal{L}}^{-}\operatorname{GL}_{n}\mathbb{R}$, ${\mathcal{L}}^{-}\operatorname{U}_{p,q}$: they are all generated by just simple projective loops. Recall that Terng–Uhlenbeck studied the dressing actions of such projective loops as generalized Bäcklund transformations for integrable systems. Our result makes a nice supplement: any rational dressing is the composition of these Bäcklund transformations. This conclusion is surprising in the sense that Lie theory suggests the indispensable role of nilpotent loops in the case of noncompact reality conditions, and nilpotent dressings appear quite complicated and mysterious. The sacrifice is to introduce some extra fake singularities. So we also propose a set of generators if fake singularities are forbidden. A very geometric and physical construction of $\operatorname{U}_{p,q}$ is obtained as a by-product, generalizing the classical construction of unitary groups.

Keywords

loop groupintegrable systemdressing actionBäcklund transformationnilpotent

MSC classification

Primary: 22E67: Loop groups and related constructions, group-theoretic treatment 37K35: Lie-Bäcklund and other transformations
Secondary: 53C43: Differential geometric aspects of harmonic maps
Type
Research Article
Information
Journal of the Institute of Mathematics of Jussieu , Volume 21 , Issue 2 , March 2022 , pp. 459 - 485
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Copyright
© Cambridge University Press 2020

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