The Global Existence for the Derivative Nonlinear Schr\"odinger Equation with solitons
Abstract
The global existence of the solution for the second-type derivative nonlinear Schr\"odinger (DNLSII) equation with solitons is presented for the first time on the line with weighted Sobolev initial data in H2( R) H1,1(R ). The modified Darboux transformation is applied as a main research tool to analyze the global existence for the Cauchy problem by adding or subtracting a finite number of zeros of the scattering data. For this purpose, it is necessary to study the invertibility and uniqueness of the Darboux transformation first acting on the weighted Sobolev space. The analysis of time evolution comprehensively demonstrates the existence of a unique global solution to the DNLSII equation with Cauchy problem in H2( R) H1,1(R ).
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