Effect of lower order terms on the well-posedness of Majda-Biello systems
Abstract
This paper investigates a noteworthy phenomenon within the framework of Majda-Biello systems, wherein the inclusion of lower-order terms can enhance the well-posedness of the system. Specifically, we investigate the initial value problem (IVP) of the following system: \[ \ arrayl ut + uxxx = - v vx, vt + α vxxx + β vx = - (uv)x, (u,v)|t=0 = (u0,v0) ∈ Hs(R) × Hs(R), array . x ∈ R, \, t ∈ R, \] where α ∈ R \0\ and β ∈ R. Let s*(α, β) be the smallest value for which the IVP is locally analytically well-posed in Hs(R)× Hs(R) when s > s(α, β). Two interesting facts have already been known in literature: s*(α, 0) = 0 for α ∈ (0,4)\1\ and s*(4,0) = 34. Our key findings include the following: For s*(4,β), a significant reduction is observed, reaching 12 for β > 0 and 14 for β < 0. Conversely, when α ≠ 4, we demonstrate that the value of β exerts no influence on s*(α, β). These results shed light on the intriguing behavior of Majda-Biello systems when lower-order terms are introduced and provide valuable insights into the role of α and β in the well-posedness of the system.
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