The Gibbs–Wilbraham phenomenon in the approximation of | x | by using Lagrange interpolation on the Chebyshev–Lobatto nodal systems
DATE:
2022-11
UNIVERSAL IDENTIFIER: http://hdl.handle.net/11093/3497
EDITED VERSION: https://linkinghub.elsevier.com/retrieve/pii/S0377042722001856
DOCUMENT TYPE: article
ABSTRACT
Along this study we find and deeply analyze a new Gibbs phenomenon. As far as
we know, this type of behavior, in different contexts, is connected with functions
having jump discontinuities. In our case it is related to the behavior of the Lagrange
interpolation polynomials of the continuous absolute value function. Our study is related
to the error of the Lagrange polynomial interpolants of the function |x| on [−1, 1]
taking as nodal system the m + 2 nodes of the extended Chebyshev polynomial of the
second kind, obtaining that the error behaves like a function of order O(1/m). A detailed
description and approximation of the function is presente.