The well-posedness of stochastic Korteweg--de Vries equations revisited
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Abstract
In this paper, we propose a new view, which leads to almost sure well-posedness in $H^{s}(\mathbb{R}), s\geq 0$, for studying stochastic KdV equations.
Different from \cite{de1999white} or \cite{kdvmuti}, by introducing a solution space inspired by \cite{guo2009global}, we prove the local well-posedness result only under natural $H^s(\mathbb{R}), s\geq 0$ conditions parallel to deterministic KdV equations.
Furthermore, just basing on the $L_x^2$ conservation law of KdV equations, we extend the solution to a global one.
The well-posedness frame obtained in this paper not only reduces several restrictions of the noise kernel, but may also have crucial values when one deals with dynamical problems of stochastic KdV equations.