Error estimates of the cubic interpolated pseudo-particle scheme for one-dimensional advection equations

Abstract

Error estimates of cubic interpolated pseudo-particle scheme (CIP scheme) for the one-dimensional advection equation with periodic boundary conditions are presented. The CIP scheme is a semi-Lagrangian method involving the piecewise cubic Hermite interpolation. Although it is numerically known that the space-time accuracy of the scheme is third order, its rigorous proof remains an open problem. In this paper, denoting the spatial and temporal mesh sizes by h and t respectively, we prove an error estimate O( t3 + h4 t) in L2 norm theoretically, which justifies the above-mentioned prediction if h = O( t) . The proof is based on properties of the interpolation operator; the most important one is that it behaves as the L2 projection for the second-order derivatives. We remark that the same strategy perfectly works as well to address an error estimate for the semi-Lagrangian method with the cubic spline interpolation.