We study mixing properties of epimorphisms of a compact connected finite-dimensional abelian group X. In particular, we show that a set F, with |F| > dim X, of epimorphisms of X is mixing if and only if every subset of F of cardinality (dim X) + 1 is mixing. We also construct examples of free non-abelian groups of automorphisms of tori which are mixing, but not mixing of order 3, and show that, under some irreducibility assumptions, ergodic groups of automorphisms contain mixing subgroups and free non-abelian mixing subsemigroups
We prove that every mixing Zd-action by automorphisms of a compact, connected, abelian group is mixi...
Abstract. We characterize mildly mixing group actions of a noncompact, locally compact, second count...
For N d-actions by algebraic endomorphisms on compact abelian groups, the existence of non-mixing co...
We prove that every mixing Z(d)-action by automorphisms of a compact, connected, abelian group is mi...
Mixing for measure-preserving group actions is a fundamental notion in ergodic theory, with differen...
A generalization of the classical ergodic mixing theorem is given, valid for arbitrary topological s...
Abstract. Using techniques related to the (C,F)-actions we construct explicitly mixing rank-one (by ...
We prove that the concepts of completely mixing, mixing, and weakly mixing probability measures on a...
Abstract. We study compact group extensions of hyperbolic dif-feomorphisms. We relate mixing propert...
We define a stronger property than unique ergodicity with respect to the fixed-point subalgebra firs...
Abstract. A measure preserving action of a countably infinite group Γ is called totally ergodic if e...
Abstract. LetG be a second countable locally compact group andH a closed subgroup. We characterize t...
Abstract. We define topological and measure-theoretic mixing for nonstationary dynamical systems and...
We define topological and measure-theoretic mixing for nonstationary dynamical systems and prove tha...
Abstract. In ergodic theory, given sufficient conditions on the system, every weak mixing N-action i...
We prove that every mixing Zd-action by automorphisms of a compact, connected, abelian group is mixi...
Abstract. We characterize mildly mixing group actions of a noncompact, locally compact, second count...
For N d-actions by algebraic endomorphisms on compact abelian groups, the existence of non-mixing co...
We prove that every mixing Z(d)-action by automorphisms of a compact, connected, abelian group is mi...
Mixing for measure-preserving group actions is a fundamental notion in ergodic theory, with differen...
A generalization of the classical ergodic mixing theorem is given, valid for arbitrary topological s...
Abstract. Using techniques related to the (C,F)-actions we construct explicitly mixing rank-one (by ...
We prove that the concepts of completely mixing, mixing, and weakly mixing probability measures on a...
Abstract. We study compact group extensions of hyperbolic dif-feomorphisms. We relate mixing propert...
We define a stronger property than unique ergodicity with respect to the fixed-point subalgebra firs...
Abstract. A measure preserving action of a countably infinite group Γ is called totally ergodic if e...
Abstract. LetG be a second countable locally compact group andH a closed subgroup. We characterize t...
Abstract. We define topological and measure-theoretic mixing for nonstationary dynamical systems and...
We define topological and measure-theoretic mixing for nonstationary dynamical systems and prove tha...
Abstract. In ergodic theory, given sufficient conditions on the system, every weak mixing N-action i...
We prove that every mixing Zd-action by automorphisms of a compact, connected, abelian group is mixi...
Abstract. We characterize mildly mixing group actions of a noncompact, locally compact, second count...
For N d-actions by algebraic endomorphisms on compact abelian groups, the existence of non-mixing co...