The Symmetric Regularized-Long-Wave Equation: Ill-posedness and Long Period Limit
Abstract
In the present work we obtain two important results for the Symmetric Regulraized-Long-Wave equation. First we prove that the initial value problem for this equation is ill-posed for data in Hs(R)× Hs-1(R), if s< 0, in the sense that the flow-map cannot be continuous at the origin from Hs(R)× Hs-1(R) to even (D'(R))2. We also establish an exact theory of convergence of the periodic solutions to the continuous one, in Sobolev spaces, as the period goes to infinity.
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