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Teoreticheskaya i Matematicheskaya Fizika, 1998, Volume 115, Number 1, Pages 3–28
DOI: https://doi.org/10.4213/tmf854 (Mi tmf854) 		 
This article is cited in 8 scientific papers (total in 8 papers)

Homogeneous Stäckel-type systems

A. V. Tsiganov

St. Petersburg State University, Faculty of Physics
Full-text PDF (330 kB) Citations (8)
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DOI: https://doi.org/10.4213/tmf854
Abstract: A class of Hamiltonian dynamic systems integrated by the variable separation method is considered. The integration for this class is the inversion of an Abel mapping on hyperelliptic curves. We prove that the derivative of the Abel mapping is the Stäckel matrix, which determines a diagonal Riemannian metric and curvilinear orthogonal coordinate systems in a flat space. Lax representations with the spectral parameter are constructed. The corresponding classical r-matrices are dynamic. It is shown how the class of pointwise canonical transformations can be naturally generalized using the Abel integral reduction theory.
Received: 17.11.1997
English version:
Theoretical and Mathematical Physics, 1998, Volume 115, Issue 1, Pages 377–395
DOI: https://doi.org/10.1007/BF02575497
Bibliographic databases:
Language: Russian
Citation: A. V. Tsiganov, “Homogeneous Stäckel-type systems”, TMF, 115:1 (1998), 3–28; Theoret. and Math. Phys., 115:1 (1998), 377–395
Citation in format AMSBIB
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Linking options:
  • https://www.mathnet.ru/eng/tmf854
  • https://doi.org/10.4213/tmf854
  • https://www.mathnet.ru/eng/tmf/v115/i1/p3
    • This publication is cited in the following 8 articles:
    1. Kozlov V.V., “On the Problem of Separation of Variables in Systems of Ordinary Differential Equations”, Differ. Equ., 57:10 (2021), 1299–1306  crossref  isi
    2. A. V. Tsiganov, “Construction of Separation Variables for Finite-Dimensional Integrable Systems”, Theoret. and Math. Phys., 128:2 (2001), 1007–1024  mathnet  crossref  crossref  mathscinet  zmath  isi  elib
    3. Klishevich, VV, “Exact solution of Dirac and Klein-Gordon-Fock equations in a curved space admitting a second Dirac operator”, Classical and Quantum Gravity, 18:17 (2001), 3735  crossref  mathscinet  zmath  adsnasa  isi  scopus  scopus  scopus
    4. A. V. Tsiganov, “Canonical transformations of the extended phase space and integrable systems”, Theoret. and Math. Phys., 124:1 (2000), 918–937  mathnet  crossref  crossref  mathscinet  zmath  isi
    5. A. V. Tsiganov, “Degenerate integrable systems on the plane with a cubic integral of motion”, Theoret. and Math. Phys., 124:3 (2000), 1217–1233  mathnet  crossref  crossref  mathscinet  zmath  isi
    6. A. V. Tsiganov, “Outer automorphisms of sl(2), integrable systems, and mappings”, Theoret. and Math. Phys., 118:2 (1999), 164–172  mathnet  crossref  crossref  mathscinet  zmath  isi  elib
    7. A. V. Tsiganov, “Noncanonical time transformations relating finite-dimensional integrable systems”, Theoret. and Math. Phys., 120:1 (1999), 840–861  mathnet  crossref  crossref  mathscinet  zmath  isi  elib
    8. Tsiganov, AV, “Automorphisms of sl(2) and classical integrable systems”, Physics Letters A, 251:6 (1999), 354  crossref  mathscinet  zmath  adsnasa  isi  scopus  scopus  scopus
    Citing articles in Google Scholar: Russian citations, English citations
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    		Теоретическая и математическая физика Theoretical and Mathematical Physics
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