Introduction

Bogdanov, L. V.

doi:10.1007/978-94-011-4495-7_1

L. V. Bogdanov³

Part of the book series: Mathematics and Its Applications ((MAIA,volume 493))

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Abstract

The main objects studied in this book are the generalized Kadomtsev-Petviashvili (KP) hierarchy and generalized multicomponent KP hierarchy, which unite several different types of continuous and discrete integrable systems connected with the standard KP and multicomponent KP hierarchies.

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References

M. Sato (1981) Soliton equations as dynamical systems on infinite dimensional Grassmann manifolds, RIMS, Kokyurokn, Kyoto Univ., Vol. 439, pp. 30–46
Google Scholar
Sato, M.; Sato, Y. (1983) Soliton equations as dynamical systems on infinitedimensional Grassmann manifold. Nonlinear partial differential equations in applied science (Tokyo, 1982), Eds. H. Fujita et al. North-Holland, Amsterdam-New York. Pp. 259–271
Google Scholar
M. Jimbo and T. Miwa (1983) Publ. RIMS, Kyoto Univ., Solitons and infinitedimensional Lie algebras, Vol. 19, pp. 943–1001
MathSciNet MATH Google Scholar
Date, E.; Kashiwara, M.; Jimbo, M.; Miwa, T. (1983) Transformation groups for soliton equations, Nonlinear integrable systems—classical theory and quantum theory(Kyoto, 1981), Eds. M. Jimbo and T. Miwa. World-Scientific Publishing, Singapore. Pp. 39–119
Google Scholar
Segal, G.; Wilson, G. (1985) Loop groups and equations of KdV type, Inst. Hautes Etudes Sci. Publ. Math., Vol. 61, pp. 5–65
Article MathSciNet MATH Google Scholar
Segal, G.; Pressley, A. (1986) Loop groups. Clarendon, Oxford.
MATH Google Scholar
Van Moerbeke, P. (1994) Integrable foundations of string theory, Lectures on integrable systems (Sophia-Antipolis, 1991), Eds. O. Babelon et al. World Scientific Publishing, River Edge, NJ. Pp. 163–267
Google Scholar
Adler, M.; van Moerbeke, P. (1994) Birkhoff strata, Backlund transformations, and regularization of isospectral operators, Adv. Math., Vol. 108 no. 1, pp. 140–204
Article MathSciNet MATH Google Scholar
Zakharov, V. E.; Manakov, S. V. (1984) Multidimensional nonlinear integrable systems and methods for constructing their solutions, (Russian) Zap. Nauchn. Sem.Leningrad. Otdel Mat. Inst. Steklov. (LOMI), Vol. 133, pp. 77–91
MathSciNet MATH Google Scholar
Zakharov, V. E.; Manakov, S. V. (1985) Construction of multidimensional nonlinear integrable systems and their solutions, (Russian.) Funktsional. Anal, i Prilozhen. Vol. 19 no. 2, pp. 11–25
MathSciNet Google Scholar
Bogdanov, L. V.; Manakov, S. V. (1988) The nonlocal ¯∂ problem and (2 + 1) dimensional soliton equations, I. Phys. A, Vol. 21 no. 10, pp. L537–L544
MathSciNet ADS MATH Google Scholar
Zakharov, V. E. (1990) On the dressing method, Inverse methods in action (Montpellier, 1989), Ed. P. C. Sabatier. Springer-Verlag, Berlin. Pp. 602–623
Chapter Google Scholar
B. G. Konopelchenko (1993) Solitons in multidimensions. World Scientific, Singapore.
MATH Google Scholar
Carroll, R.; Konopelchenko, B. (1993) D-bar dressing and Sato theory, Lett. Math, Phys., Vol. 28 no. 4, pp. 307–319
Article MathSciNet ADS MATH Google Scholar
Bogdanov, L. V. (1995) Generalized Hirota bilinear identity and integrable indifference and lattice hierarchies, Phys. D, Vol. 87 no. 1–4, pp. 58–63
Article MathSciNet MATH Google Scholar
Bogdanov, L. V.; Konopelchenko, B. G. (1995) Lattice and q-diffrence Darboux Zakharov-Manakov systems via ¯∂-dressing method, J. Phys. A, Vol. 28 no. 5, pp. L173-L178
Google Scholar
Bogdanov, L. V.; Konopelchenko, B. G. (1997) Generalized integrable hierarchiesand Combescure symmetry transformations, J. Phys. A, Vol. 30 no. 5, pp. 1591 1603
Google Scholar
Bogdanov, L. V.; Konopelchenko, B. G. (1998) Analytic-bilinear approach to integrable hierarchies. I. Generalized KP hierarchy., J. Math. Phys., Vol. 39 no. 9, pp. 4683–4700
Article MathSciNet ADS MATH Google Scholar
Bogdanov, L. V.; Konopelchenko, B. G. (1998) Analytic-bilinear approach to integrable hierarchies. II. Multicomponent KP and 2D Toda lattice hierarchies., J.Math. Phys.,Vol. 39 no. 9, pp. 4701–4728
Article MathSciNet ADS MATH Google Scholar
Grinevich, P. G.; Orlov, A. Yu. (1989) Virasoro action on Riemann surfaces, Grassmannians, det ¯∂ and Segal-Wilson τ-function, Problems of modern quantum fieldtheory (Alushta, 1989), Eds. A. A. Belavin et al. Springer-Verlag, Berlin. Pp. 86–106
Chapter Google Scholar
Miwa, T. (1982) On Hirota’s difference equations, Proc. Japan Acad. Ser. A Math. Set., Vol. 58 no. 1, pp. 9–12
Article MathSciNet MATH Google Scholar

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L.D. Landau Institute for Theoretical Physics, Russian Academy of Sciences, Moscow, Russia
L. V. Bogdanov

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L. V. Bogdanov
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Bogdanov, L.V. (1999). Introduction. In: Analytic-Bilinear Approach to Integrable Hierarchies. Mathematics and Its Applications, vol 493. Springer, Dordrecht. https://doi.org/10.1007/978-94-011-4495-7_1

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DOI: https://doi.org/10.1007/978-94-011-4495-7_1
Publisher Name: Springer, Dordrecht
Print ISBN: 978-94-010-5922-0
Online ISBN: 978-94-011-4495-7
eBook Packages: Springer Book Archive

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