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BULLOUGH, R.K., CAUDREY, P.J.: “The soliton and its history” in “Solitons” (Bullough R.K. and Caudrey, P.J., eds), Lecture Notes in Physics, Springer, Heidelberg, 1979; and also references quoted there.
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CALOGERO, F., DEGASPERIS, A.: “Reduction technique for matrix nonlinear evolution equations solvable by the Spectral Transform”. To appear in J. of Math.Phys.
For an introductory review, see DEGASPERIS, A.: “Spectral Transform and solvability on nonlinear evolution equations” in “Nonlinear Problems in Theoretical Physics” (Rañada, A.F. ed.) Lecture Notes in Physics, 98, Springer 1979, pp.35–90.
The class of solvable equations is actually larger, as a t-dependent polynomial of L could act also on Qt and the functions nα n and β v could dependent also on t. See Ref. (2-d).
DEGASPERIS, A.: “Solitons, Boomerons, Trappons”, in “Nonlinear Evolution Equations solvable by the Spectral Transform” (Calogero F., ed.) Research Notes in Mathematics 26, Pitman Publishing, London, 1978, pp.97–126.
CALOGERO, F., DEGASPERIS, A.: “Coupled nonlinear evolution equations solvable via the inverse Spectral Transform, and solitons that come back: the Boomeron”. Lett. Nuovo Cimento 16, 425–433 (1976).
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CALOGERO, F., DEGASPERIS, A.: “Conservation laws for classes of nonlinear evolution equations solvable by the Spectral Transform”. Comm.Math.Phys. 63, 155–176 (1978).
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PIRANI, F., SOLIANI, G. (private communication).
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Degasperis, A. (1982). Reduction technique for matrix nonlinear evolution equations. In: Boiti, M., Pempinelli, F., Soliani, G. (eds) Nonlinear Evolution Equations and Dynamical Systems. Lecture Notes in Physics, vol 120. Springer, Berlin, Heidelberg. https://doi.org/10.1007/3-540-09971-9_48
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