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Bilinear Integrable Systems: from Classical to Quantum, Continuous to Discrete Ludwig Faddeev

Bilinear Integrable Systems: from Classical to Quantum, Continuous to Discrete By Ludwig Faddeev

Bilinear Integrable Systems: from Classical to Quantum, Continuous to Discrete by Ludwig Faddeev


Bilinear Integrable Systems: from Classical to Quantum, Continuous to Discrete Summary

Bilinear Integrable Systems: from Classical to Quantum, Continuous to Discrete: Proceedings of the NATO Advanced Research Workshop on Bilinear Integrable Systems: From Classical to Quantum, Continuous to Discrete St. Petersburg, Russia, 15-19 September 2002 by Ludwig Faddeev

On April 29, 1814 Napoleon landed on the island of Elba, surrounded with a personal army of 1200 men. The allies, Russia, Prussia, England and Austria, hadforcedhimintoexileafteranumberofverycostlydefeats;hewasdeprived ofallhistitles,butcouldkeepthetitleofEmperorofElba. Historytellsusthat each morning he took long walks in the sun, reviewed his army each midday anddiscussedworldmatterswithnewlyappointedadvisors,followingthesame pattern everyday, to the great surprise of Campbell, the British of?cer who was to keep an eye on him. All this made everyone believe he was settled there for good. Napoleononcesaid:Elbaisbeautiful,butabitsmall. Elbawasde?nitely a source of inspiration; indeed, the early morning, March 6, 1815, Metternich, the chancellor of Austria was woken up by one of his aides with the stunning news that Napoleon had left Elba with his 1200 men and was marching to Paris with little resistance; A few days later he took up his throne again in the Tuileries. In spite of his insatiable hunger for battles and expansion, he is remembered as an important statesman. He was a pioneer in setting up much of the legal, administrative and political machinery in large parts of continental Europe. We gathered here in a lovely and quaint ?shing port, Marciana Marina on theislandofElba,tocelebrateoneofthepioneersofintegrablesystems,Hirota Sensei,andthisattheoccasionofhisseventiethbirthday. Trainedasaphysicist in his home university Kyushu University, Professor Hirota earned his PhD in '61 at Northwestern University with Professor Siegert in the ?eld of Quantum Statistical mechanics. He wrote a widely appreciated Doctoral dissertation on FunctionalIntegralrepresentationofthegrandpartitionfunction.

Table of Contents

The CKP hierarchy and the WDVV prepotential; H. Aratyn, J. van de Leur.- Quantum invariance groups of particle algebras; M. Arik.- Algebraic Hirota maps; C. Athorne.- Boundary states in Susy Sine-Gordon model; Z. Bajnok et al.- Geometry of discrete integrability. The consistency approach; A.I. Bobenko.- Homoclinic orbits and dressing method; E.V. Doktorov, V.M. Rothos.- Riemann-Hilbert problem and algebraic curves; V. Enolskii, T. Grava.- Analytic and algebraic aspects of Toda field theories and their real Hamiltonian forms; V.S. Gerdjikov.- Bilinear avatars of the discrete Painleve II equation; B. Grammaticos et al.- Orthogonal polynomials satisfying Q-difference equations; L. Haine.- Discretization of coupled soliton equations; R. Hirota.- An adelic W-algebra and rank one bispectral operators; E. Horozov.- Toroidal Lie algebra and bilinear identity of the self-dual Yang-Mills hierarchy; S. Kakei.- From soliton equations to their zero curvature formulation; F. Lambert, J. Springael.- Covariant forms of Lax one-field operators: from Abelian to non-commutative; S. Leble.- On the Dirichlet boundary problem and Hirota equations; A. Marshakov, A. Zabrodin.- Functional-difference deformations of Darboux-Poeshl-Teller potentials; V.B. Matveev.- Maxwell equations for quantum space-time; R.M. Mir-Kasmov.- A solvable model of interacting photons; J. Naudts.- Discretization of a Sine-Gordon type equation; Y. Ohta.- Hierarchy of quantum explicitly solvable and integrable models; A.K. Pogrebkov.- A two-parameter elliptic extension of the lattice KDV system; S.E. Puttock, F.W. Nijhoff.- Travelling waves in a per-turbed discrete Sine-Gordon equation; V.M. Rothos, M. Feckan.- Quantum VS classical Calogero-Moser systems; R. Sasaki.- Geometrical dynamics of an integrable piecewise-linear mapping; D. Takahashi, M. Iwao.- Free bosons and dispersionless limit of Hirota tau-function; L.A. Takhtajan.- Similarity reductions of Hirota bilinear equations and Painleve equations; K.M.Tamizhmani et al.- On fundamental cycle of periodic Box-Ball systems; T. Tokihiro.- Combinatorics and integrable geometry; P. van Moerbeke.- On reductions of some KDV-type systems and their link to the quartic Henon-Heiles Hamiltonian; C. Verhoeven et al.- On the bilinear forms of Painleve's 4th equation; R. Willox, J. Hietarinta.

Additional information

NLS9781402035029
9781402035029
1402035020
Bilinear Integrable Systems: from Classical to Quantum, Continuous to Discrete: Proceedings of the NATO Advanced Research Workshop on Bilinear Integrable Systems: From Classical to Quantum, Continuous to Discrete St. Petersburg, Russia, 15-19 September 2002 by Ludwig Faddeev
New
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Springer-Verlag New York Inc.
2006-05-31
378
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