Banach spaces with the $2$-summing property
泛函分析
2016-09-06 v1
摘要
A Banach space has the -summing property if the norm of every linear operator from to a Hilbert space is equal to the -summing norm of the operator. Up to a point, the theory of spaces which have this property is independent of the scalar field: the property is self-dual and any space with the property is a finite dimensional space of maximal distance to the Hilbert space of the same dimension. In the case of real scalars only the real line and real have the -summing property. In the complex case there are more examples; e.g., all subspaces of complex and their duals.
引用
@article{arxiv.math/9403206,
title = {Banach spaces with the $2$-summing property},
author = {Alvaro Arias and Tadek Figiel and William B. Johnson and Gideon Schechtman},
journal= {arXiv preprint arXiv:math/9403206},
year = {2016}
}