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Journal of Nonlinear Mathematical Physics Volume 20, 2013 - Issue sup1: The Geometry of the Painlevé Equations: Guest editors Nalini Joshi, Masatoshi Noumi, Hidetaka Sakai, Claude M. Viallet
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Article

Bäcklund transformations for certain rational solutions of Painlevé VI

Johan van de LeurMathematical Institute, University of Utrecht, P.O. Box 80010, 3508TAUtrecht, The NetherlandsCorrespondence[email protected]
&
Henrik AratynDepartment of Physics, University of Illinois at Chicago, 845 W. Taylor St., Chicago, IL60607-7059Correspondence[email protected]
Pages 3-16 | Received 21 Aug 2012, Accepted 11 Jun 2013, Published online: 07 Nov 2013

References

  • H. Aratyn and J. van de Leur, Solutions of the Painlevé VI equation from reduction of integrable hierarchy in a Grassmannian approach. Int. Math. Res. Not. IMRN 2008, Art. ID rnn 080, 41 pp.
  • H. Aratyn and J. van de Leur, The symplectic Kadomtsev-Petviashvili hierarchy and rational solutions of Painlevé VI, Ann. Inst. Fourier 55 (6) (2005), 1871–1903
  • P. Boalch, Six results on Painleve′ VI, in Theories asymptotiques et equations de Painlevé - Angers, Eric Delabaere - Michle Loday-Richaud (Ed.) SMF, Seminaires et congres, vol 14, (2006) 1–20 [arXiv:math.AG/0503043]
  • M. Jimbo and T. Miwa, Monodromy preserving deformations of linear ordinary differential equations with rational coefficients II, Physica 2D, 407–448 (1981).
  • N. Joshi, A. V. Kitaev and P. A. Treharne, On the Linearization of the Painlevé III-VI Equations and Reductions of the Three-Wave Resonant System. J. Math. Phys. 48, 103512 (2007) [arXiv:math.CA/0706.1750]
  • V. G. Kac and J. W. van de Leur, The n-component KP hierarchy and representation theory, Jour. Math. Phys. 44, 3245–3293 (2003).
  • S. Kakei and T. Kikuchi, The sixth Painlevé equation as similarity reduction of gl3 hierarchy, Lett. Math. Phys. 79, 221–234 (2007), [arXiv:nlin.SI/0508021]
  • P. Lorenzoni, Darboux-Egorov system, bi-flat F -manifolds and Painlevé VI, arXiv: 1207.5979
  • M. Mazzocco, Rational solutions of the Painlevé VI equation. Kowalevski Workshop on Mathematical Methods of Regular Dynamics (Leeds, 2000). J. Phys. A 34 (2001), no. 11, 22812294.
  • M. Noumi, Painlevé equations through symmetry. Translations of Mathematical Monographs, 223. American Mathematical Society, Providence, RI, 2004. x + 156 pp.
  • M. Noumi and Y. Yamada, Symmetries in Painlevé equations [translation of Sügaku 53 (2001), no. 1, 62 75; MR1816984]. Sugaku Expositions. Sugaku Expositions 17 (2004), no. 2, 203218.
  • M. Noumi and Y. Yamada, A new Lax pair for the sixth Painleveé equation associated with so(8). Microlocal analysis and complex Fourier analysis, 238252, World Sci. Publ., River Edge, NJ, 2002 .
  • K. Okamoto, Studies on the Painlevé equations. I. Sixth Painlevé equation PVI, Annali di Mathematica pura ed applicata 146, 337–381 (1987)

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