TITLE:
The Local Theory of Completely 1-Summing Mapping Spaces
AUTHORS:
Yafei Zhao, Yuanyi Wang
KEYWORDS:
Completely 1-Summing Mapping Space, Injectivity, Nuclearity, Local Reflexivity, Exactness, Finite-Representability and Operator Space
JOURNAL NAME:
Journal of Applied Mathematics and Physics,
Vol.11 No.6,
June
26,
2023
ABSTRACT: In this paper, we investigate local properties in the system of completely 1-summing mapping spaces. We introduce notions of injectivity, local reflexivity, exactness, nuclearity and finite-representability in the system of completely 1-summing mapping spaces. First we obtain that if V has WEP, V is locally reflexive in the system (Ⅱ1(⋅,⋅), π1(⋅)) if and only if it is locally reflexive in the system (Ⅰ(⋅,⋅), t(⋅)). Furthermore we prove that an operator space V ⊆ B(H) is exact in the system (Ⅱ1(⋅,⋅), π1(⋅)) if and only if V is finitely representable in {Mn}n∈N in the system (Ⅱ1(⋅,⋅), π1(⋅)). At last, we show that an operator space V is finitely representable in {Mn}n∈N in the system (Ⅱ1(⋅,⋅), π1(⋅)) if and only if V = C.