Approximation error of the Lagrange reconstructing polynomial

Abstract

The reconstruction approach [Shu C.W.: SIAM Rev. 51 (2009) 82--126] for the numerical approximation of f'(x) is based on the construction of a dual function h(x) whose sliding averages over the interval [x-12Δx,x+12Δx] are equal to f(x) (assuming an homogeneous grid of cell-size Δx). We study the deconvolution problem [Harten A., Engquist B., Osher S., Chakravarthy S.R.: J. Comp. Phys. 71 (1987) 231--303] which relates the Taylor polynomials of h(x) and f(x), and obtain its explicit solution, by introducing rational numbers τn defined by a recurrence relation, or determined by their generating function, gτ(x), related with the reconstruction pair of ex. We then apply these results to the specific case of Lagrange-interpolation-based polynomial reconstruction, and determine explicitly the approximation error of the Lagrange reconstructing polynomial (whose sliding averages are equal to the Lagrange interpolating polynomial) on an arbitrary stencil defined on a homogeneous grid.