Gilles Pisier 
Complex Interpolation between Hilbert, Banach and Operator Spaces [PDF ebook] 

支持

Motivated by a question of Vincent Lafforgue, the author studies the Banach spaces $X$ satisfying the following property: there is a function $/varepsilon/to /Delta_X(/varepsilon)$ tending to zero with $/varepsilon>0$ such that every operator $T/colon / L_2/to L_2$ with $/T//le /varepsilon$ that is simultaneously contractive (i.e., of norm $/le 1$) on $L_1$ and on $L_/infty$ must be of norm $/le /Delta_X(/varepsilon)$ on $L_2(X)$. The author shows that $/Delta_X(/varepsilon) /in O(/varepsilon^/alpha)$ for some $/alpha>0$ iff $X$ is isomorphic to a quotient of a subspace of an ultraproduct of $/theta$-Hilbertian spaces for some $/theta>0$ (see Corollary 6.7), where $/theta$-Hilbertian is meant in a slightly more general sense than in the author’s earlier paper (1979).

€105.43
支付方式
购买此电子书可免费获赠一本!
格式 PDF ● 网页 78 ● ISBN 9781470405922 ● 出版者 American Mathematical Society ● 下载 3 时 ● 货币 EUR ● ID 6613165 ● 复制保护 Adobe DRM
需要具备DRM功能的电子书阅读器

来自同一作者的更多电子书 / 编辑

48,763 此类电子书