Finite-dimensional invariant subspaces for measurable semigroups of linear operators
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Publication:1097501
DOI10.1016/0022-247X(87)90129-6zbMath0635.47037OpenAlexW2045980317MaRDI QIDQ1097501
Anthony To-Ming Lau, James C. S. Wong
Publication date: 1987
Published in: Journal of Mathematical Analysis and Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0022-247x(87)90129-6
Fixed-point theorems (47H10) Groups and semigroups of linear operators (47D03) Invariant subspaces of linear operators (47A15)
Related Items (7)
Invariant subspace theorems for amenable groups ⋮ Common fixed point properties and amenability of a class of Banach algebras ⋮ Generalised \(F\)-algebras as predual algebras of \( JBW ^\ast\)-triples and characterisations of the Fourier algebras on locally compact groups ⋮ Finite-dimensional invariant subspace property and amenability for a class of Banach algebras ⋮ Algebraic and analytic properties of semigroups related to fixed point properties of non-expansive mappings ⋮ Invariant Subspaces for Algebras of Linear Operators and Amenable Locally Compact Groups ⋮ Topologically left invariant means on semigroup algebras
Cites Work
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- Fixed-point theorems for compact convex sets
- Finite dimensional invariant subspaces for a semigroup of linear operators
- Invariant means on almost periodic functions and fixed point properties
- Topological semigroups and fixed points
- Correction to my paper 'Fixed-point theorems for compact convex sets'
- Amenable Groups and Groups with the Fixed Point Property
- Function Algebras, Means, and Fixed Points
- Invariant Means and Fixed Points; A Sequel to Mitchell's Paper
- A Remark on Groups with the Fixed Point Property
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