We prove that every mixing Zd-action by automorphisms of a compact, connected, abelian group is mixing of all orders
Abstract. Let d ≥ 2, and let α be an expansive and mixing Zd-action by automorphisms of a compact, a...
Abstract. An irreducible algebraic Zd-action α on a compact abelian group X is a Zd-action by automo...
Abstract. In this paper we consider Zd-actions, d ≥ 1, by automorph-isms of compact connected abelia...
We prove that every mixing Z(d)-action by automorphisms of a compact, connected, abelian group is mi...
Let a be a Zd-action (d ³ 2) by automorphisms of a compact metric abelian group. For any non-linear ...
Given an algebraic $Z^d$-action corresponding to a prime ideal of a Laurent ring of polynomials in s...
Actions of Zd by automorphisms of compact zero-dimensional groups exhibit a range of mixing behaviou...
We prove a result on linear equations over multiplicative groups in positive characteristic. This is...
We study mixing properties of algebraic actions of Qd, showing in particular that prime mixing Qd-ac...
We show that the measure preserving action of Z2 dual to the action defined by the commuting automor...
Mixing for measure-preserving group actions is a fundamental notion in ergodic theory, with differen...
Given an expansive action a of Z2 by automorphisms of a compact connected metrizable abelian group X...
We study mixing properties of epimorphisms of a compact connected finite-dimensional abelian group X...
AbstractLet (Σ, σ) be a Zd-subshift of finite type. Under a strong irreducibility condition (strong ...
Let $l\in \mathbb{N}_{\geq 1}$ and $\alpha : \mathbb{Z}^l\rightarrow \text{Aut}(\mathscr{N})$ be an ...
Abstract. Let d ≥ 2, and let α be an expansive and mixing Zd-action by automorphisms of a compact, a...
Abstract. An irreducible algebraic Zd-action α on a compact abelian group X is a Zd-action by automo...
Abstract. In this paper we consider Zd-actions, d ≥ 1, by automorph-isms of compact connected abelia...
We prove that every mixing Z(d)-action by automorphisms of a compact, connected, abelian group is mi...
Let a be a Zd-action (d ³ 2) by automorphisms of a compact metric abelian group. For any non-linear ...
Given an algebraic $Z^d$-action corresponding to a prime ideal of a Laurent ring of polynomials in s...
Actions of Zd by automorphisms of compact zero-dimensional groups exhibit a range of mixing behaviou...
We prove a result on linear equations over multiplicative groups in positive characteristic. This is...
We study mixing properties of algebraic actions of Qd, showing in particular that prime mixing Qd-ac...
We show that the measure preserving action of Z2 dual to the action defined by the commuting automor...
Mixing for measure-preserving group actions is a fundamental notion in ergodic theory, with differen...
Given an expansive action a of Z2 by automorphisms of a compact connected metrizable abelian group X...
We study mixing properties of epimorphisms of a compact connected finite-dimensional abelian group X...
AbstractLet (Σ, σ) be a Zd-subshift of finite type. Under a strong irreducibility condition (strong ...
Let $l\in \mathbb{N}_{\geq 1}$ and $\alpha : \mathbb{Z}^l\rightarrow \text{Aut}(\mathscr{N})$ be an ...
Abstract. Let d ≥ 2, and let α be an expansive and mixing Zd-action by automorphisms of a compact, a...
Abstract. An irreducible algebraic Zd-action α on a compact abelian group X is a Zd-action by automo...
Abstract. In this paper we consider Zd-actions, d ≥ 1, by automorph-isms of compact connected abelia...
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