Add to ORKGWe establish a close relationship between, on the one hand, expanding, codimension one attractors of diffeomorphisms on closed manifolds (examples of so-called strange attractors), and, on the other, spaces which arise in the study of aperiodic tilings. We show that every such orientable attractor is homeomorphic to a tiling space of either a substitution or a projection tiling, depending on its dimension. We also demonstrate that such an attractor is shape equivalent to a (d+1)-dimensional torus with a finite number of points removed, or, in the nonorientable case, to a space with a two-to-one covering by such a torus-less-points. This puts considerable constraints on the topology of codimension one attractors, and constraints on which man...
Let E be a normed linear space and suppose that A is the global attractor of either (i) a homeomorph...
28 pages, 4 figuresInternational audienceWe prove that the set of diffeomorphisms having at most fin...
In the 1960’s and 1970’s, mathematicians discovered geometric patterns which displayed a high degree...
We establish a close relationship between, on the one hand, expanding, codimension one attractors of...
We establish a close relationship between, on the one hand, expanding, codimension one attractors of...
We focus on dynamical systems which are one-dimensional expanding attractors with a local product st...
Aperiodic tilings are interesting to mathematicians and scientists for both theoretical and practica...
In this paper we study the properties of expanding maps with a single discontinuity on a closed inte...
AbstractWe consider the basin WsΛ of a 1-dimensional hyperbolic attractor Λ in an m-dimensional mani...
We focus on families of hyperbolic attractors for diffeomorphisms of the solid surface of genus two ...
We focus on families of hyperbolic attractors for diffeomorphisms of the solid surface of genus two ...
We focus on families of hyperbolic attractors for diffeomorphisms of the solid surface of genus two ...
AbstractMotivated by a topological classification of tiling spaces by Barge and Diamond, we construc...
We focus on families of hyperbolic attractors for diffeomorphisms of the solid surface of genus two ...
AbstractA diffeomorphism is said to have a thick attractor provided that its attractor has positive ...
Let E be a normed linear space and suppose that A is the global attractor of either (i) a homeomorph...
28 pages, 4 figuresInternational audienceWe prove that the set of diffeomorphisms having at most fin...
In the 1960’s and 1970’s, mathematicians discovered geometric patterns which displayed a high degree...
We establish a close relationship between, on the one hand, expanding, codimension one attractors of...
We establish a close relationship between, on the one hand, expanding, codimension one attractors of...
We focus on dynamical systems which are one-dimensional expanding attractors with a local product st...
Aperiodic tilings are interesting to mathematicians and scientists for both theoretical and practica...
In this paper we study the properties of expanding maps with a single discontinuity on a closed inte...
AbstractWe consider the basin WsΛ of a 1-dimensional hyperbolic attractor Λ in an m-dimensional mani...
We focus on families of hyperbolic attractors for diffeomorphisms of the solid surface of genus two ...
We focus on families of hyperbolic attractors for diffeomorphisms of the solid surface of genus two ...
We focus on families of hyperbolic attractors for diffeomorphisms of the solid surface of genus two ...
AbstractMotivated by a topological classification of tiling spaces by Barge and Diamond, we construc...
We focus on families of hyperbolic attractors for diffeomorphisms of the solid surface of genus two ...
AbstractA diffeomorphism is said to have a thick attractor provided that its attractor has positive ...
Let E be a normed linear space and suppose that A is the global attractor of either (i) a homeomorph...
28 pages, 4 figuresInternational audienceWe prove that the set of diffeomorphisms having at most fin...
In the 1960’s and 1970’s, mathematicians discovered geometric patterns which displayed a high degree...