Global well-posedness and orbital stability of solitary waves for Zakharov-Ito equation
Abstract
In this paper, we consider the Zakharov-Ito equation equation* cases ut+uxxx+3uux+x=0,\\ t+(u)x=0. cases equation* We prove the local well-posedness in Hs× Hs for s>3/2 and global well-posedness in Hs× Hs for s≥2. When =0, the Zakharov-Ito equation reduces to the KdV equation, hence has solitary waves with speeds c∈(0,+∞). We prove the orbital stability of these solitary waves in H1× L2 by combining a variational approach and the framework of Grillakis, Shatah and Strauss GSS1987.
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