Add to ORKGThe Besicovitch pseudodistance defined in [BFK99] for one-dimensional configurations is invariant by translations. We generalize the definition to arbitrary groups and study how properties of the pseudodistance, including invariance by translations, are determined by those of the sequence of finite sets used to define it. In particular, we recover that if the Besicovitch pseudodistance comes from a nondecreasing exhaustive Følner sequence, then every shift is an isometry. For non-Følner sequences, we prove that some shifts are not isometries, and the Besicovitch pseudodistance with respect to some subsequence even makes them non-continuous
Abstract. We investigate algebraic properties of the automorphism group of mul-tidimensional shifts ...
International audienceThe Besicovitch and Weyl pseudo-distances are shift-invariant pseudometrics on...
We show that Bernoulli shifts induce, on a dense class of sets, weakly mixing automorphisms which ar...
International audienceThe Besicovitch pseudodistance defined in [1] for biinfinite sequences is inva...
We study continuous 1-dimensional time parametrization and (n - 1)-dimensional direction parametriza...
AbstractWe give two independent methods for obtaining examples of separable spaces X for which C(X) ...
A G-shift of finite type (G-SFT) is a shift of finite type which commutes with the continuous action...
Abstract. A survey of properties of invariant pseudodistances and pseudometrics is given with specia...
At present time invariant pseudodistances and pseudometrics pose an important tool in complex analys...
AbstractThe Besicovitch and Weyl topologies on the space of configurations take a point of view comp...
Shift spaces are sets of colorings of a group which avoid a set of forbidden patterns and are endowe...
We use the theory of Borel equivalence relations to analyze the equiva-lence relation of isomorphism...
The purpose of the present work is to introduce a framework which enables us to study nonlinear homo...
Let G be a finite group, and let XG = {x = (x(s,t)) Î GZ2 : x(s,t) = x(s,t-1)·x(s+1,t-1)for all (s,t...
The purpose of this article is to consider two themes, both of which emanate from and involve the Ko...
Abstract. We investigate algebraic properties of the automorphism group of mul-tidimensional shifts ...
International audienceThe Besicovitch and Weyl pseudo-distances are shift-invariant pseudometrics on...
We show that Bernoulli shifts induce, on a dense class of sets, weakly mixing automorphisms which ar...
International audienceThe Besicovitch pseudodistance defined in [1] for biinfinite sequences is inva...
We study continuous 1-dimensional time parametrization and (n - 1)-dimensional direction parametriza...
AbstractWe give two independent methods for obtaining examples of separable spaces X for which C(X) ...
A G-shift of finite type (G-SFT) is a shift of finite type which commutes with the continuous action...
Abstract. A survey of properties of invariant pseudodistances and pseudometrics is given with specia...
At present time invariant pseudodistances and pseudometrics pose an important tool in complex analys...
AbstractThe Besicovitch and Weyl topologies on the space of configurations take a point of view comp...
Shift spaces are sets of colorings of a group which avoid a set of forbidden patterns and are endowe...
We use the theory of Borel equivalence relations to analyze the equiva-lence relation of isomorphism...
The purpose of the present work is to introduce a framework which enables us to study nonlinear homo...
Let G be a finite group, and let XG = {x = (x(s,t)) Î GZ2 : x(s,t) = x(s,t-1)·x(s+1,t-1)for all (s,t...
The purpose of this article is to consider two themes, both of which emanate from and involve the Ko...
Abstract. We investigate algebraic properties of the automorphism group of mul-tidimensional shifts ...
International audienceThe Besicovitch and Weyl pseudo-distances are shift-invariant pseudometrics on...
We show that Bernoulli shifts induce, on a dense class of sets, weakly mixing automorphisms which ar...