Exact asymptotics of the optimal Lp-error of asymmetric linear spline approximation
Abstract
In this paper we study the best asymmetric (sometimes also called penalized or sign-sensitive) approximation in the metrics of the space Lp, 1≤slant p≤slant∞, of functions f∈ C2([0,1]2) with nonnegative Hessian by piecewise linear splines s∈ S(N), generated by given triangulations N with N elements. We find the exact asymptotic behavior of optimal (over triangulations N and splines s∈ S(N) error of such approximation as N ∞.
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