Diophantine conditions in well-posedness theory for a coupled modulated Korteweg-de Vries system
Abstract
We study the well-posedness theory of a coupled modulated Korteweg-de Vries (KdV) system on the circle with a time non-homogeneous modulation acting on the linear dispersion term. When the coupling parameter is equal to one, it has been recently proved that given any s∈ R, the resulting modulated KdV system is globally well-posed in Hs(T)× Hs(T), with a sufficiently irregular modulation. For couplings different from one, we use Diophantine conditions to characterize the resonances and prove that (under further restrictions on the coupling constant) for any s∈ R the coupled modulated KdV system is globally well-posed in Hs(T)× Hs(T). This result differs from its unmodulated counterpart where it is known that global well-posedness holds for s s*∈ (5/7,1].
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