首页 | 本学科首页   官方微博 | 高级检索  
     


On nonlinear -widths
Authors:Dinh Dung   Vu Quoc Thanh
Affiliation:Institute of Information Technology, Nghia Do, Tu Liem, Hanoi 10000, Vietnam ; Institute of Information Technology, Nghia Do, Tu Liem, Hanoi 10000, Vietnam
Abstract:
For characterization of best nonlinear approximation, DeVore,
Howard, and Micchelli have recently suggested the nonlinear $n$-width $delta _n(W,X)$ of a subset $W$ in a normed linear space $X$. We proved by a topological method that for $delta _n(W,X)$ and the well-known Aleksandrov $n$-width $a_n(W,X)$ in a Banach space $X$ the following inequalities hold: $delta _{2n+1}(W,X)le a_n(W,X)le delta _n(W,X)$. Let $K_{p,theta }^{alpha }$ be the unit ball of Besov space $B_{p,theta }^{alpha },quad alpha >0,quad 1le p,theta le infty $, of multivariate periodic functions. Then for approximation in $L_q,quad 1le qle infty $, with some restriction on $p,q$ and $alpha $, we established the asymptotic degree of these $n$-widths: $a_n(K_{p,theta }^{alpha },L_q)approx delta _n(K_{p,theta }^{alpha }, L_q)approx n^{-alpha }$.

Keywords:Nonlinear approximation   $n$-widths   Besov space
点击此处可从《Proceedings of the American Mathematical Society》浏览原始摘要信息
点击此处可从《Proceedings of the American Mathematical Society》下载全文
设为首页 | 免责声明 | 关于勤云 | 加入收藏

Copyright©北京勤云科技发展有限公司  京ICP备09084417号