Connections between (positive) mean ergodic operators acting in Banach lattices and properties of the underlying lattice itself are well understood (see the works of Emel'yanov, Wolff and Zaharopol). For Fréchet lattices (or more general locally convex solid Riesz spaces) there is virtually no information available. For a Fréchet lattice E, it is shown here that (amongst other things) every power-bounded linear operator on E is mean ergodic if and only if E is reflexive if and only if E is Dedekind ?-complete and every positive power-bounded operator on E is mean ergodic if and only if every positive power-bounded operator in the strong dual E?? (no longer a Fréchet lattice) is mean ergodic. An important technique is to develop criteria tha...
AbstractFor Banach lattices E which are countably order complete or contain a topological orthogonal...
AbstractLet X be a Banach space with a basis. We prove the following characterizations: (i)X is fini...
Dedicated to the memory of Aryeh Dvoretzky We construct on any quasi-reflexive of order 1 separable ...
Connections between (positive) mean ergodic operators acting in Banach lattices and properties of th...
Connections between (positive) mean ergodic operators acting in Banach lattices and properties of th...
Given a Banach lattice E that fails to be countably order complete, we construct a positive compact ...
Classical results of Pelczynski and of Zippin concerning bases in Banach spaces are extended to the ...
AbstractIn any reflexive Banach (lattice), the resolvent (resp. the Césàro means) of a mean-bounded ...
In this thesis, we study two problems. The first one is the renorming problem in Banach lattices. We...
AbstractLet X be a Banach space with a basis. We prove the following characterizations: (i)X is fini...
Aspects of the theory of mean ergodic operators and bases in Fréchet spaces were recently developed ...
AbstractWe characterize quasi-reflexive Fréchet spaces with a basis in terms of the properties of th...
We characterize properties of Banach spaces by mean ergodicity of operators belonging to special cla...
For a Cesàro bounded operator in a Hilbert space or a reflexive Banach space the mean ergodic theore...
Abstract We present criteria for determining mean ergodicity of C0–semigroups of linear operators in...
AbstractFor Banach lattices E which are countably order complete or contain a topological orthogonal...
AbstractLet X be a Banach space with a basis. We prove the following characterizations: (i)X is fini...
Dedicated to the memory of Aryeh Dvoretzky We construct on any quasi-reflexive of order 1 separable ...
Connections between (positive) mean ergodic operators acting in Banach lattices and properties of th...
Connections between (positive) mean ergodic operators acting in Banach lattices and properties of th...
Given a Banach lattice E that fails to be countably order complete, we construct a positive compact ...
Classical results of Pelczynski and of Zippin concerning bases in Banach spaces are extended to the ...
AbstractIn any reflexive Banach (lattice), the resolvent (resp. the Césàro means) of a mean-bounded ...
In this thesis, we study two problems. The first one is the renorming problem in Banach lattices. We...
AbstractLet X be a Banach space with a basis. We prove the following characterizations: (i)X is fini...
Aspects of the theory of mean ergodic operators and bases in Fréchet spaces were recently developed ...
AbstractWe characterize quasi-reflexive Fréchet spaces with a basis in terms of the properties of th...
We characterize properties of Banach spaces by mean ergodicity of operators belonging to special cla...
For a Cesàro bounded operator in a Hilbert space or a reflexive Banach space the mean ergodic theore...
Abstract We present criteria for determining mean ergodicity of C0–semigroups of linear operators in...
AbstractFor Banach lattices E which are countably order complete or contain a topological orthogonal...
AbstractLet X be a Banach space with a basis. We prove the following characterizations: (i)X is fini...
Dedicated to the memory of Aryeh Dvoretzky We construct on any quasi-reflexive of order 1 separable ...