Interpolatory estimates for convex piecewise polynomial approximation (1811.01087v1)

Abstract: In this paper, among other things, we show that, given $r\in N$, there is a constant $c=c(r)$ such that if $f\in C^r[-1,1]$ is convex, then there is a number ${\mathcal N}={\mathcal N}(f,r)$, depending on $f$ and $r$, such that for $n\ge{\mathcal N}$, there are convex piecewise polynomials $S$ of order $r+2$ with knots at the Chebyshev partition, satisfying [ |f(x)-S(x)|\le c(r)\left( \min\left{ 1-x^2, n^{-1}\sqrt{1-x^2} \right} \right)^r \omega_2\left(f^{(r)}, n^{-1}\sqrt{1-x^2} \right), ] for all $x\in [-1,1]$. Moreover, ${\mathcal N}$ cannot be made independent of $f$.