English

One cubic 3-monotone spline

Classical Analysis and ODEs 2015-09-29 v1

Abstract

For any 3-monotone on [a,b][a,b] function ff (its third divided differences are nonnegative for all choices of four distinct points, or equivalently, ff has a convex derivative on (a,b)(a,b)) we construct a cubic 3-monotone (like ff) spline ss with nNn\in \Bbb N "almost" equidistant knots aja_j such that fs[aj,aj1]cω4(f,(ba)/n,[aj+4,aj5][a,b]),j=1,...,n, \left\Vert f-s \right\Vert_{[a_j,a_{j-1}]} \le c\, \omega_4 \left(f,(b-a)/n,[a_{j+4},a_{j-5}]\cap [a,b]\right), \quad j=1,...,n, where cc is an absolute constant, ω4(f,t,[,])\omega_4 \left(f,t,[\cdot,\cdot]\right) is the 44-th modulus of smoothness of ff, and [,]||\cdot ||_{[\cdot,\cdot]} is the max-norm.

Keywords

Cite

@article{arxiv.1509.08070,
  title  = {One cubic 3-monotone spline},
  author = {German Dzyubenko},
  journal= {arXiv preprint arXiv:1509.08070},
  year   = {2015}
}

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in Ukrainian

R2 v1 2026-06-22T11:06:21.668Z