Local well-posedness for a system of modified KdV equations in modulation spaces

Abstract

In this work, we consider the initial value problem (IVP) for a system of modified Korteweg-de Vries (mKdV) equations equation cases ∂t v + ∂x3 v+ ∂x (v w2) = 0, 0.98 cm v(x,0)=(x),\\ ∂t w + α ∂x3 w+∂x (v2 w) = 0,0.5 cm w(x,0)=φ(x). cases equation The main interest is in addressing the well-posedness issues of the IVP when the initial data are considered in the modulation space Ms2,p(R), p≥ 2. In the case when 0<α 1, we derive new trilinear estimates in these spaces and prove that the IVP is locally well-posed for data in Ms2,p(R) whenever s> 14-1p and p≥ 2. In deriving the trilinear estimate, the fact that the Fourier supports of the solution components v and w lie on distinct cubic curves, namely τ = 3 and τ = α3, introduces additional difficulties in handling the resonant case. This makes the analysis substantially different from what one encounters in the single-equation setting. To overcome the difficulties arising in the resonant case, it was necessary to impose the more restrictive condition s> 14-1p on the trilinear estimate, rather than the natural threshold s> 14-32p , which would otherwise yield sharp local well-posedness for s>-12 when p=2.

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