Uniform well-posedness and Inviscid limit for the KdV-Burgers and mKdV-Burgers equations on T

Abstract

This article investigates uniform well-posedness and inviscid limit behavior for the periodic Korteweg-de Vries-Burgers (KdV-B) and modified Korteweg-de Vries-Burgers (mKdV-B) equations: \[ ∂t u + ∂x3 u - ∂x2 u = ∂x(uα), u(0) = φ, \] where α = 2, 3, ∈ (0, 1] is the diffusion coefficient, and u : R+ × T R is real-valued. For the KdV-B equation (α=2), we establish unconditional uniform global well-posedness in Hs(T) for s ≥ 0, uniformly for all ∈ [0,1], without relying on auxiliary function spaces. Furthermore, we prove that for any s ≥ 0, there exists T > 0 such that solutions converge in C([0,T]; Hs) to those of the KdV equation as 0. For the mKdV-B equation (α=3), we establish analogous results--unconditional uniform well-posedness and inviscid limit behavior in Hs(T) for s ≥ 1/2.