AbstractEquicontinuous semigroups of transformations of a compact Hausdorff space and their sets of all invariant (Borel, regular and probabilistic) measures are studied. Conditions equivalent to the existence of at least one invariant measure are given. The (algebraic and topological) structure of the set of invariant measures is researched
The study of invariant means on spaces of functions associated with a group or semigroup has been th...
We prove that if S is an uncountable subsemigroup of a group, then every (left or right)-translation...
We establish the generic inexistence of stationary Borel probability measures for aperiodic Borel ac...
AbstractEquicontinuous semigroups of transformations of a compact Hausdorff space and their sets of ...
The aim of the paper is to show that if \(\mathcal{F}\) is a family of continuous transformations of...
Abstract. We give sufficient conditions for a group of homeomorphisms of a compact Hausdorff space t...
The aim of the paper is to show that if F is a family of continuous transformations of a nonempty co...
We prove existence and uniqueness for invariant measures of strongly continuous semigroups on L²(X ;...
Bogachev V, Röckner M, Zhang TS. Existence and uniqueness of invariant measures: An approach via sec...
Beznea L, Cimpean I, Röckner M. A new approach to the existence of invariant measures for Markovian ...
The class of ergodic, invariant probability Borel measure for the shift action of a countable group ...
We study the dynamics of projective transformations and apply it to (i) prove that the isotropy subg...
A metric measure space is a complete, separable metric space equipped with a probability measure tha...
A metric measure space is a complete, separable metric space equipped with a probability measure tha...
The study of the existence of non-separable invariant measures on various spaces equipped with trans...
The study of invariant means on spaces of functions associated with a group or semigroup has been th...
We prove that if S is an uncountable subsemigroup of a group, then every (left or right)-translation...
We establish the generic inexistence of stationary Borel probability measures for aperiodic Borel ac...
AbstractEquicontinuous semigroups of transformations of a compact Hausdorff space and their sets of ...
The aim of the paper is to show that if \(\mathcal{F}\) is a family of continuous transformations of...
Abstract. We give sufficient conditions for a group of homeomorphisms of a compact Hausdorff space t...
The aim of the paper is to show that if F is a family of continuous transformations of a nonempty co...
We prove existence and uniqueness for invariant measures of strongly continuous semigroups on L²(X ;...
Bogachev V, Röckner M, Zhang TS. Existence and uniqueness of invariant measures: An approach via sec...
Beznea L, Cimpean I, Röckner M. A new approach to the existence of invariant measures for Markovian ...
The class of ergodic, invariant probability Borel measure for the shift action of a countable group ...
We study the dynamics of projective transformations and apply it to (i) prove that the isotropy subg...
A metric measure space is a complete, separable metric space equipped with a probability measure tha...
A metric measure space is a complete, separable metric space equipped with a probability measure tha...
The study of the existence of non-separable invariant measures on various spaces equipped with trans...
The study of invariant means on spaces of functions associated with a group or semigroup has been th...
We prove that if S is an uncountable subsemigroup of a group, then every (left or right)-translation...
We establish the generic inexistence of stationary Borel probability measures for aperiodic Borel ac...
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