Error estimates for semi-Lagrangian schemes with higher-order interpolation for conservation laws with dispersive terms

Abstract

We establish error estimates for semi-Lagrangian schemes for the initial value problem of one-dimensional conservation laws with a dispersive term, including the Korteweg--de Vries equation. The schemes considered in this paper are based on the semi-Lagrangian technique combined with spatial discretization by higher-order interpolation operators. For the semi-Lagrangian schemes equipped with the spline or Hermite interpolation operators of order 2 s - 1 , we derive an L2-error estimate of O ( tr + h2s / t) and an Hs -error estimate of O ( tr + hs / t) , where h and t denote the spatial mesh size and the time step size, respectively, and r ∈ 0, 1 is a parameter determined by the discretization of the dispersive term. A key step in the analysis is to establish the stability of the interpolation operators. Under suitable assumptions, interpolation operators of order 2s - 1 are stable with respect to the Hs -norm as well as a weighted Hs -norm. The weighted Hs-norm depends on h and t, and it reduces to the L2-norm in the limit h 0 .

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