Convergence error estimates at low regularity for time discretizations of KdV
Abstract
We consider various filtered time discretizations of the periodic Korteweg--de Vries equation: a filtered exponential integrator, a filtered Lie splitting scheme as well as a filtered resonance based discretisation and establish convergence error estimates at low regularity. Our analysis is based on discrete Bourgain spaces and allows to prove convergence in L2 for rough data u0 ∈ Hs, s>0 with an explicit convergence rate.
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