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Hauptverfasser: Karmakar, Debabrata, Lin, Chang-Shou, Nie, Zhaohu, Wei, Juncheng
Format: Preprint
Veröffentlicht: 2016
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Online-Zugang:https://arxiv.org/abs/1605.07759
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_version_ 1866929760072892416
author Karmakar, Debabrata
Lin, Chang-Shou
Nie, Zhaohu
Wei, Juncheng
author_facet Karmakar, Debabrata
Lin, Chang-Shou
Nie, Zhaohu
Wei, Juncheng
contents In this article we obtain total masses of solutions to the Toda system associated to a general simple Lie algebra with singular sources at the origin. The determination of such total masses is one of the important steps towards establishing the a priori bound for solutions to the mean field type of Toda system on compact surfaces. The total mass is found to be related to the longest element $κ$ in the Weyl group of the corresponding Lie algebra. This is the foundation to future work relating the local blowup masses (from analysis) with the Weyl group. This work generalizes the previous works in Lin et al. (2012), Ao et al. (2015) and Nie (20160 for Toda systems of types $A, G_2$ and $B, C$. However, a more Lie-theoretic method is needed here for the general case, and the method relies heavily on the DPW method, Drinfeld-Sokolov gauge and the $W$-invariants. The last crucial step for the total masses is obtained by applying the work of Kostant (1979) on the one dimensional Toda lattice.
format Preprint
id arxiv_https___arxiv_org_abs_1605_07759
institution arXiv
publishDate 2016
record_format arxiv
spellingShingle Total masses of solutions to general Toda systems with singular sources
Karmakar, Debabrata
Lin, Chang-Shou
Nie, Zhaohu
Wei, Juncheng
Analysis of PDEs
Differential Geometry
Representation Theory
Exactly Solvable and Integrable Systems
35J47, 35J91, 17B80
In this article we obtain total masses of solutions to the Toda system associated to a general simple Lie algebra with singular sources at the origin. The determination of such total masses is one of the important steps towards establishing the a priori bound for solutions to the mean field type of Toda system on compact surfaces. The total mass is found to be related to the longest element $κ$ in the Weyl group of the corresponding Lie algebra. This is the foundation to future work relating the local blowup masses (from analysis) with the Weyl group. This work generalizes the previous works in Lin et al. (2012), Ao et al. (2015) and Nie (20160 for Toda systems of types $A, G_2$ and $B, C$. However, a more Lie-theoretic method is needed here for the general case, and the method relies heavily on the DPW method, Drinfeld-Sokolov gauge and the $W$-invariants. The last crucial step for the total masses is obtained by applying the work of Kostant (1979) on the one dimensional Toda lattice.
title Total masses of solutions to general Toda systems with singular sources
topic Analysis of PDEs
Differential Geometry
Representation Theory
Exactly Solvable and Integrable Systems
35J47, 35J91, 17B80
url https://arxiv.org/abs/1605.07759