Normed linear relations: Domain decomposability, adjoint subspaces, and selections
From MaRDI portal
Publication:1175276
DOI10.1016/0024-3795(91)90215-IzbMath0737.47002MaRDI QIDQ1175276
Publication date: 25 June 1992
Published in: Linear Algebra and its Applications (Search for Journal in Brave)
operator partadjoint subspace of a closed linear relationclosed-graph theoremnormed linear relationsopen-mapping principleorthogonal domain decomposability of linear relationssingle-valued linear selection
General (adjoints, conjugates, products, inverses, domains, ranges, etc.) (47A05) Open mapping and closed graph theorems; completeness (including (B)-, (B_r)-completeness) (46A30)
Related Items
Uniform Boundedness of Norms of Convex and Nonconvex Processes ⋮ THE ESSENTIAL STATE DIAGRAM FOR LINEAR RELATIONS IN NORMED SPACES ⋮ Boundedness and closedness of linear relations ⋮ Multivalued Fredholm type operators with abstract generalized inverses ⋮ Adjoint characterisations of quasi-weakly compact linear relations.
Cites Work
- Operational calculus of linear relations
- Least-squares solutions of multi-valued linear operator equations in Hilbert spaces
- Infinitely many nonhomogeneous conditions
- Constrained least-squares solutions of linear inclusions and singular control problems in Hilbert spaces
- Notes on generalized boundary value problems in Banach spaces. II: Infinite dimensional extension theory
- Stieltjes differential-boundary operators. III: Multivalued operators - linear relations
- Adjoint subspaces in Banach spaces, with applications to ordinary differential subspaces
- Über adjungierte Funktionaloperatoren
- Relative self-adjoint operators in Hilbert space
- Optimal Linearization of Equations Involving Monotone Operators
- Gradient Method for Nondensely Defined Closed Unbounded Linear Operators
- Inner, outer, and generalized inverses in banach and hilbert spaces
- Regularity and Stability for Convex Multivalued Functions
- Coordinatized Adjoint Subspaces in Hilbert Spaces, with Application to Ordinary Differential Operators
- A unified approach to generalized inverses of linear operators: I. Algebraic, topological and projectional properties
- Monotone processes of convex and concave type
- Normed Convex Processes
- Functional Operators (AM-22), Volume 2
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
