Stability of the sum of two solitary waves for (gDNLS) in the energy space
Abstract
In this paper, we continue the study in MiaoTX:DNLS:Stab. We use the perturbation argument, modulational analysis and the energy argument in MartelMT:Stab:gKdV, MartelMT:Stab:NLS to show the stability of the sum of two solitary waves with weak interactions for the generalized derivative Schr\"odinger equation (gDNLS) in the energy space. Here (gDNLS) hasn't the Galilean transformation invariance, the pseudo-conformal invariance and the gauge transformation invariance, and the case σ>1 we considered corresponds to the L2-supercritical case.
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