Email this article Phase portraits of the full symmetric Toda systems on rank-2 groups
- Authors: Sorin A.S.1,2,3, Chernyakov Y.B.1,4, Sharygin G.I.1,4,5
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Affiliations:
- Joint Institute for Nuclear Research
- Dubna International University
- National Research Nuclear University MEPhI (Moscow Engineering Physics Institute)
- Institute for Theoretical and Experimental Physics
- Lomonosov Moscow State University
- Issue: Vol 193, No 2 (2017)
- Pages: 1574-1592
- Section: Article
- URL: https://journals.rcsi.science/0040-5779/article/view/171484
- DOI: https://doi.org/10.1134/S0040577917110022
- ID: 171484
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Abstract
We continue investigations begun in our previous works where we proved that the phase diagram of the Toda system on special linear groups can be identified with the Bruhat order on the symmetric group if all eigenvalues of the Lax matrix are distinct or with the Bruhat order on permutations of a multiset if there are multiple eigenvalues. We show that the phase portrait of the Toda system and the Hasse diagram of the Bruhat order coincide in the case of an arbitrary simple Lie group of rank 2. For this, we verify this property for the two remaining rank-2 groups, Sp(4,ℝ) and the real form of G2.
About the authors
A. S. Sorin
Joint Institute for Nuclear Research; Dubna International University; National Research Nuclear University MEPhI (Moscow Engineering Physics Institute)
Author for correspondence.
Email: sorin@theor.jinr.ru
Russian Federation, Dubna, Moscow Oblast; Dubna, Moscow Oblast; Moscow
Yu. B. Chernyakov
Joint Institute for Nuclear Research; Institute for Theoretical and Experimental Physics
Email: sorin@theor.jinr.ru
Russian Federation, Dubna, Moscow Oblast; Moscow
G. I. Sharygin
Joint Institute for Nuclear Research; Institute for Theoretical and Experimental Physics; Lomonosov Moscow State University
Email: sorin@theor.jinr.ru
Russian Federation, Dubna, Moscow Oblast; Moscow; Moscow
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