Orthogonality for Biadjoints of Operators
Document Type
Article
Publication Title
Indian Statistical Institute Series
Abstract
Let X, Y be non-reflexive Banach spaces. Let L(X, Y) be the space of bounded operators from X to Y. For T∈ L(X, Y), and a closed subspace Z⊂ Y, this paper deals with the question, if T⊥ L(X, Z) in the sense of Birkhoff-James, when is T∗ ∗⊥ L(X∗ ∗, Z⊥⊥) ? If Z⊂ Y is a subspace of finite codimension which is the kernel of projection of norm one, we show that this is always the case. Moreover in this case, there is an extreme point Λ of the unit ball of the bidual X∗ ∗ such that ‖ T∗ ∗‖ = ‖ T∗ ∗(Λ ) ‖ and T∗ ∗(Λ ) ⊥ Z⊥⊥.
First Page
191
Last Page
196
DOI
10.1007/978-981-99-2310-6_10
Publication Date
1-1-2023
Recommended Citation
Rao, T. S.S.R.K., "Orthogonality for Biadjoints of Operators" (2023). Open Access archive. 8995.
https://impressions.manipal.edu/open-access-archive/8995