中文

Polynomial approximation on convex subsets of $\mathbb R^n

泛函分析 2007-05-23 v1 经典分析与常微分方程

摘要

Let K be a closed bounded convex subset of Rn\Bbb R^n; then by a result of the first author, which extends a classical theorem of Whitney there is a constant wm(K)w_m(K) so that for every continuous function f on K there is a polynomial ϕ\phi of degree at most m-1 so that f(x)ϕ(x)wm(K)supx,x+mhKΔhm(f;x). |f(x)-\phi(x)|\le w_m(K)\sup_{x,x+mh\in K} |\Delta_h^m(f;x)|. The aim of this paper is to study the constant wm(K)w_m(K) in terms of the dimension n and the geometry of K. For example we show that w2(K)12[log2n]+54w_2(K)\le \frac12[\log_2n]+\frac54 and that for suitable K this bound is almost attained. We place special emphasis on the case when K is symmetric and so can be identified as the unit ball of finite-dimensional Banach space; then there are connections between the behavior of wm(K)w_m(K) and the geometry (particularly the Rademacher type) of the underlying Banach space. It is shown for example that if K is an ellipsoid then w2(K)w_2(K) is bounded, independent of dimension, and w3(K)logn.w_3(K)\sim \log n. We also give estimates for w2w_2 and w3w_3 for the unit ball of the spaces pn\ell_p^n where 1p.1\le p\le \infty.

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引用

@article{arxiv.math/9910160,
  title  = {Polynomial approximation on convex subsets of $\mathbb R^n},
  author = {Y. Brudnyi and N. J. Kalton},
  journal= {arXiv preprint arXiv:math/9910160},
  year   = {2007}
}

备注

36 pages