Reduction technique for matrix nonlinear evolution equations

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5. CALOGERO, F., DEGASPERIS, A.: “Reduction technique for matrix nonlinear evolution equations solvable by the Spectral Transform”. To appear in J. of Math.Phys.

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6. 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.

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7. The class of solvable equations is actually larger, as a t-dependent polynomial of L could act also on Q_t and the functions nα _n and β _v could dependent also on t. See Ref. (2-d).

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8. 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.

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15. Private communication.

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