In order to approximate functions defined on (−1, 1) with exponential growth for |x| → 1, we consider interpolation processes based on the zeros of orthonormal polynomials with respect to exponential weights. Convergence results and error estimates in weighted L^p metric and uniform metric are given. In particular, in some function spaces, the related interpolating polynomials behave essentially like the polynomial of best approximation.
Lagrange interpolation with exponential weights on (-1,1)
MASTROIANNI, Giuseppe Maria;NOTARANGELO, INCORONATA
2013-01-01
Abstract
In order to approximate functions defined on (−1, 1) with exponential growth for |x| → 1, we consider interpolation processes based on the zeros of orthonormal polynomials with respect to exponential weights. Convergence results and error estimates in weighted L^p metric and uniform metric are given. In particular, in some function spaces, the related interpolating polynomials behave essentially like the polynomial of best approximation.File in questo prodotto:
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