LOCALLY AND COLOCALLY FACTORABLE BANACH SPACES
JEBREEN, F. B. H. JAMJOOM and H. M. . 2009
We generalize the concept of locality (resp. colocality) to the concept of locally factorable (resp. colocally factorable). In addition we show that locally factorable and colocally factorable are inherited by complemented subspace, then we present some examples and establish relations between locally factorable and colocally factorable. We prove some relations between being finitely (resp. cofinitely) represented in a Banach space and being locally factorable (resp. colocally factorable) some family of finite dimensional Banach spaces
We discuss the λ-function in the general setting of JB∗-triples. Several results connecting the λ-function with the distance of a vector to the Brown–Pedersen’s quasi-invertible elements and…
We generalize the concept of locality (resp. colocality) to the concept of locally factorable (resp. colocally factorable). In addition we show that locally factorable and colocally factorable are…
It is well known (see[9, 11.2.18]) that if A and B are maximal abelian von Neumann subalgebras of von Neumann algebras M and N, respectively, then A⊗B is a maximal abelian von Neumann subalgebra…