On commuting and semi-commuting positive operators
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Publication:3189578
DOI10.1090/S0002-9939-2014-12002-8zbMath1320.47041arXiv1208.3495MaRDI QIDQ3189578
Publication date: 12 September 2014
Published in: Proceedings of the American Mathematical Society (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1208.3495
Invariant subspaces of linear operators (47A15) Commutators, derivations, elementary operators, etc. (47B47) Positive linear operators and order-bounded operators (47B65)
Related Items (5)
On the positive commutator in the radical ⋮ An inequality for tensor product of positive operators and its applications ⋮ On the dimension of the algebra generated by two positive semi-commuting matrices ⋮ Spectral radius inequalities for positive commutators ⋮ On the submultiplicativity and subadditivity of the spectral and essential spectral radius
Cites Work
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- Extensions of Perron-Frobenius theory
- The irreducibility in ordered Banach algebras
- On positive commutators
- More on positive commutators
- A generalized Jentzsch theorem
- Ideal-triangularizability of semigroups of positive operators
- Irreducible compact operators
- On the spectral radius of positive operators
- Invariant subspaces of operators on \(\ell_ p\)-spaces
- Invariant subspace theorems for positive operators
- The Perron-Frobenius theorem revisited
- Simultaneous triangularization
- Some spectral properties of positive linear operators
- Some properties of essential spectra of a positive operator
- Once more on positive commutators
- Strong Monotonicity of Spectral Radius of Positive Operators
- Invariant subspaces of super left-commutants
- Triangularizing semigroups of positive operators on an atomic normed Riesz Space
- A version of the Lomonosov invariant subspace theorem for real Banach spaces
- Minimal vectors of positive operators
- Irreducible semigroups of positive operators on Banach lattices
- Frobenius Theory of Positive Operators: Comparison Theorems and Applications
- Common invariant subspaces for collections of operators
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