Interpolatory estimates for convex piecewise polynomial approximation
Abstract
In this paper, among other things, we show that, given r∈ N, there is a constant c=c(r) such that if f∈ Cr[-1,1] is convex, then there is a number N= N(f,r), depending on f and r, such that for n N, there are convex piecewise polynomials S of order r+2 with knots at the Chebyshev partition, satisfying \[ |f(x)-S(x)| c(r)( \ 1-x2, n-11-x2 \ )r ω2(f(r), n-11-x2 ), \] for all x∈ [-1,1]. Moreover, N cannot be made independent of f.
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