论文信息 - Best uniform polynomial approximation of some rational functions

Best uniform polynomial approximation of some rational functions

In this research paper using the Chebyshev expansion, we explicitly determine the best uniform polynomial approximation out of P"q"n (the space of polynomials of degree at most qn) to a class of rational functions of the form 1/(T"q(a)+/-T"q(x)) on [-1,1], where T"q(x) is the first kind of Chebyshev polynomial of degree q and a^2>1. In this way we give some new theorems about the best approximation of this class of rational functions. Furthermore we obtain the alternating set of this class of functions.

Mehdi Dehghan | M. R. Eslahchi

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