6533b82ffe1ef96bd1294f0b

RESEARCH PRODUCT

Adaptive rational interpolation for point values

Francesc Aràndiga

subject

Applied MathematicsExtrapolation010103 numerical & computational mathematicsFunction (mathematics)Classification of discontinuities01 natural sciences010101 applied mathematicsGibbs phenomenonComputational MathematicsNonlinear systemsymbols.namesakesymbolsOrder (group theory)Applied mathematicsPoint (geometry)0101 mathematicsMathematicsInterpolation

description

Abstract G. Ramponi et al. introduced in Carrato et al. (1997,1998), Castagno and Ramponi (1996) and Ramponi (1995) a non linear rational interpolator of order two. In this paper we extend this result to get order four. We observe the Gibbs phenomenon that is obtained near discontinuities with its weights. With the weights we propose we obtain approximations of order four in smooth regions and three near discontinuities. We also introduce a rational nonlinear extrapolation which is also of order four in the smooth region of the given function. In the experiments we calculate numerically approximation orders for the different methods described in this paper and see that they coincide with those that have been obtained theoretically. We also present reconstructions in 1d and 2d with which we reach the same conclusions.

yearjournalcountryeditionlanguage
2019-03-01Journal of Computational and Applied Mathematics
https://doi.org/10.1016/j.cam.2018.08.052